Node structure for representing 3-dimensional objects using depth image

ABSTRACT

A family of node structures for representing 3-dimensional objects using depth image are provided. These node structures can be adopted into MPEG-4 AFX for conventional polygonal 3D representations. Main formats of the family are DepthImage, PointTexture and OctreeImage. DepthImage represents an object by a union of its reference images and corresponding depth maps. PointTexture represents the object as a set of colored points parameterized by projection onto a regular 2D grid. OctreeImage converts the same data into hierarchical octree-structured voxel model, set of compact reference images and a tree of voxel-image correspondence indices. DepthImage and OctreeImage have animated versions, where reference images are replaced by videostreams. DIBR formats are very convenient for 3D model construction from 3D range-scanning and multiple source video data. MPEG-4 framework allows construction of a wide variety of representations from the main DIBR formats, providing flexible tools for effective work with 3D models. Compression of the DIBR formats is achieved by application of image (video) compression techniques to depth maps and reference images (videostreams).

This application claims the priority of Korean Patent Application No. 2002-67971, filed Nov. 4, 2002, in the Korean Intellectual Property Office. This application also claims the benefit of U.S. Provisional Application No. 60/333,167, filed Nov. 27, 2001; U.S. Provisional Application No. 60/362,545, filed Mar. 8, 2002; U.S. Provisional Application No. 60/376,563, filed May 1, 2002; and U.S. Provisional Application No. 60/395,304, filed Jul. 12, 2002. The entire contents of these applications are incorporated herein by reference.

BACKGROUND OF THE INVENTION

1. Description of the Related Art

The present invention relates to a node structure for representing depth image-based 3-dimensional (3D) objects, and more particularly, to a node structure for representing objects by images having depth information.

2. Description of the Related Art

Since the beginning of researches on 3-Dimensional (3D) graphics, it is the ultimate goal of researchers to synthesize realistic graphic scene like a real image. Therefore, research on traditional rendering technologies using polygonal models have been carried out and as a result, modeling and rendering technologies have been developed enough to provide very realistic 3D environments. However, the process for generating a complicated model needs a lot of efforts by experts and takes much time. Also, a realistic and complicated environment needs a huge amount of information and causes to lower efficiency in storage and transmission.

Currently, polygonal models are typically used for 3D object representation in computer graphics. An arbitrary shape can be substantially represented by sets of color polygons, that is, triangles. Greatly advanced software algorithms and development of graphic hardware make it possible to visualize complex objects and scenes as considerably realistic still and moving image polygonal models.

However, search for alternative 3D representations has been very active during the last decade. Main reasons for this include the difficulty of constructing polygonal models for real-world objects as well as the rendering complexity and unsatisfactory quality for producing a truly photo-realistic scene.

Demanding applications require enormous amount of polygons; for example, detailed model of a human body contains several million triangles, which are not easy to handle. Although recent progress in range-finding techniques, such as laser range scanner, allows us to acquire dense range data with tolerable error, it is still very expensive and also very difficult to obtain seamlessly complete polygonal model of the whole object. On the other hand, rendering algorithms to obtain photo-realistic quality are computationally complex and thus far from the real-time rendering.

SUMMARY OF THE INVENTION

It is an aspect of this invention to provide a node structure for representing 3-dimensional (3D) objects using depth image, for computer graphics and animation, called depth image-based representations (DIBR), that has been adopted into MPEG-4 Animation Framework eXtension (AFX).

In an aspect, a depth image-based node structure includes a texture field in which a color image containing the color for each pixel is recorded, and a depth field in which a depth value for each pixel is recorded.

In another aspect, a depth image-based node structure includes a size field in which size information of an image plane is recorded, a resolution field in which the resolution of the depth for each pixel is recorded, a depth field in which multiple pieces of depth information on each pixel are recorded, and a color field in which color information on each pixel is recorded.

In still another aspect, a depth image-based node structure includes a viewpoint field in which a viewpoint of an image plane is recorded, a visibility field in which a visibility area from the viewpoint to the image plane is recorded, a projection method field in which a projection method from the viewpoint to the image plane is recorded, a distance field in which a distance from a near plane to a far plane is recorded, and a texture field in which color image is recorded.

In yet another aspect, a depth image-based node structure includes a resolution field in which the maximum value of octree leaves along the side of an enclosing cube containing an object, is recorded, an octree field in which a structure of the internal node of the octree is recorded, an index field in which an index of the reference image corresponding to the internal node is recorded, and an image field in which the reference image is recorded.

According to the present invention, rendering time for image-based models is proportional to the number of pixels in the reference and output images, but in general, not to the geometric complexity as in polygonal case. In addition, when the image-based representation is applied to real-world objects and scene, photo-realistic rendering of natural scene becomes possible without use of millions of polygons and expensive computation.

BRIEF DESCRIPTION OF THE DRAWINGS

The patent or application file contains at least one drawing executed in color. Copies of this patent or patent application publication with color drawing(s) will be provided by the Office upon request and payment of the necessary fee.

The above objects and advantages of the present invention will become more apparent by describing in detail preferred embodiments thereof with reference to the attached drawings in which:

FIG. 1 is a diagram of examples of IBR integrated in current reference software;

FIG. 2 is a diagram of a structure of octree and the order of the children;

FIG. 3 is a graph showing Octree compression ration;

FIG. 4 is a diagram of examples of Layered depth image (LDI): (a) shows projection of the object, where dark cells (voxels) correspond to 1's and white cells to 0's, and (b) shows a 2D section in (x, depth);

FIG. 5 is a diagram showing color component of “Angel” model after rearranging its color data;

FIG. 6 is a diagram showing the orthogonal invariance of node occurrence probability: (a) shows the original current and parent node, and (b) shows the current and parent node, rotated around y axis by 90 degrees;

FIGS. 7, 8, and 9 are geometry compression figures for the best PPM-based method;

FIG. 10 is a diagram showing two ways of rearrangement of color field of “Angel” PointTexture model into 2D image;

FIG. 11 is a diagram of examples of lossless geometry and lossy color compression: (a) and (b) are original and compressed version of “Angel” model respectively, and (c) and (d) are original and compressed version of “Morton256” model respectively;

FIG. 12 is a diagram showing a BVO model and a TBVO model of “Angel”;

FIG. 13 is a diagram showing additional images taken by additional cameras in TBVO: (a) is a camera index image, (b) is a first additional image, and (c) is a second additional image;

FIG. 14 is a diagram showing an example of writing TBVO stream: (a) shows a TBVO tree structure. Gray color is “undefined” texture symbol. Each color denotes camera index, (b) shows the octree traversal order in a BVO node and camera indices, (c) shows the resultant TBVO stream, in which filled cubes and octree cube denote the texture-bytes and BVO-bytes, respectively;

FIGS. 15, 17, 18, and 19 are diagrams showing the results of TBVO compression of “Angel”, “Morton”, “Palm512”, and “Robots512”, respectively;

FIG. 16 is a diagram showing peeled images of “Angel” and “Morton” models;

FIG. 20 is a diagram of an example of the relief texture image and depth map;

FIG. 21 is a diagram of an example of Layered depth image (LDI): (a) shows Projection of the object, and (b) shows layered pixels;

FIG. 22 is a diagram of an example of Box Texture (BT), in which Six SimpleTextures (pairs of image and depth map) are used to render the model shown in the center;

FIG. 23 is a diagram of an example of Generalized Box Texture (GBT): (a) shows camera locations for ‘Palm’ model, (b) shows reference image planes for the same model (21 SimpleTextures are used);

FIG. 24 is a diagram an example showing Octree representation illustrated in 2D: (a) shows a ‘point cloud’, (b) shows the corresponding mid-maps;

FIG. 25 is pseudo-code for writing the TBVO bitstream;

FIG. 26 is a diagram showing the specification of the DIBR nodes;

FIG. 27 is a diagram of view volume model for DepthImage: (a) is in perspective view, (b) is in orthographic view;

FIG. 28 is pseudo-code of OpenGL-based rendering of SimpleTexture;

FIG. 29 is a diagram of an example showing the compression of reference image in SimpleTexture: (a) shows the original reference image, and (b) shows the modified reference image in a JPEG format;

FIG. 30 is a diagram of an example showing the rendering result of “Morton” model in different formats: (a) is in an original polygonal format, (b) is in a DepthImage format, and (c) is in an OctreeImage format;

FIG. 31 is a diagram of rendering examples: (a) shows the scanned “Tower” model in a DepthImage format, (b) shows the same model, in an OctreeImage format (scanner data were used without noise removal, hence the black dots in the upper part of the model);

FIG. 32 is a diagram of rendering examples of “Palm” model: (a) shows an original polygonal format, and (b) shows the same model, but in a DepthImage format;

FIG. 33 is a diagram of rendering example, showing a frame from “Dragon512” animation in OctreeImage;

FIG. 34 is a diagram of rendering example of “Angel512” model in a PointTexture format;

FIGS. 35A and 35B are diagrams showing the relationships of the respective nodes when representing an object in a DepthImage format having SimpleTexture nodes and PointTexture nodes, respectively; and

FIG. 36 is a diagram showing the structure of corresponding OctreeImage node when representing an object by OctreeImage nodes.

DESCRIPTION OF THE PREFERRED EMBODIMENTS

This application claims the benefits of U.S. Provisional Applications listed below, which are incorporated herein by reference in their entireties.

.ISO/IEC JTC 1/SC 29/WG 11 Coding of Moving Pictures and Audio

1. Introduction

In this document, the result of the core experiment on Image-based Rendering, AFX A8.3, is reported. This core experiment is for image-based rendering technology that uses textures with depth information. Also, based on the experiments after 57^(th) MPEG meeting and discussions during AFX AdHoc Group meeting in October, few changes made to the node specification are presented.

2. Experimental Results

2.1. Test Models

For still objects

DepthImage node with SimpleTexture

-   -   Dog     -   Tirannosaurus Rex (DepthImage, using about 20 cameras)     -   Terrasque (a monster) (DepthImage, about 20 cameras)     -   ChumSungDae (DepthImage, scanned data)     -   Palmtree (DepthImage, 20 cameras)     -   DepthImage node with LayeredTexture     -   Angel

DepthImage node with PointTexture

-   -   Angel

OctreeImage node

-   -   Creature

For animated objects

DepthImage node with SimpleTexture

-   -   Dragon     -   Dragon in scene environment

DepthImage node with LayeredTexture

-   -   Not provided

OctreeImage node

-   -   Robot     -   Dragon in scene environment

More data (scanned or modeled) shall be provided in the future.

2.2. Test Results

All the nodes proposed in Sydney are integrated into blaxxun contact 4.3 reference software. However, the sources are not uploaded in the cvs server yet.

The animated formats of the IBR needs to have synchronization between multiple movie files in such a way that images in the same key frame from each movie file must be given at the same time. However, current reference software does not support this synchronization capability, which is possible in MPEG Systems. Therefore, currently, the animated formats can be visualized assuming all animation data are already in the file. Temporarily, movies files in an AVI format are used for each animated texture.

After some experiments with layered textures, we were convinced that LayeredTexture node is not efficient. This node was proposed for Layered Depth Image. However, there is also PointTexture node that can support it. Therefore, we propose to remove the LayeredTexture node from the node specification. FIG. 1 shows examples of IBR integrated in the current reference software.

3. Updates on IBR Node Specification

The conclusion from the Sydney meeting on the IBR proposal was to have IBR stream that contains images and camera information and IBR node shall only have link (url) to it. However, during the AhG meeting in Rennes, the result of the discussion on IBR was to have images and camera information both in IBR nodes and stream. Thus, the following is the updated node specification for IBR nodes. The requirements for the IBR stream are given in the section that explains the url field.

Decoder (Bitstreams)—Node Specification

DepthImage { field SFVec3f position 0 0 10 field SFRotation orientation 0 0 1 0 field SFVec2f fieldOfView  0.785398 0.785398 field SFFloat nearPlane  10 field SFFloat farPlane 100 field SFBool orthogonal FALSE field SFNode diTexture NULL field SFString depthImageUrl “” }

The DepthImage node defines a single IBR texture. When multiple DepthImage nodes are related to each other, they are processed as a group, and thus, should be placed under the same Transform node.

The diTexture field specifies the texture with depth, which shall be mapped into the region defined in the DepthImage node. It shall be one of the various types of depth image texture (SimpleTexture or PointTexture).

The position and orientation fields specify the relative location of the viewpoint of the IBR texture in the local coordinate system. Position is relative to the coordinate system's origin (0, 0, 0), while orientation specifies a rotation relative to the default orientation. In the default position and orientation, the viewer is on the Z-axis looking down the Z-axis toward the origin with +X to the right and +Y straight up. However, the transformation hierarchy affects the final position and orientation of the viewpoint.

The fieldOfView field specifies a viewing angle from the camera viewpoint defined by position and orientation fields. The first value denotes the angle to the horizontal side and the second value denotes the angle to the vertical side. The default values are 45 degrees in radiant. However, when orthogonal field is set to TRUE, the fieldOfView field denotes the width and height of the near plane and far plane.

The nearPlane and farPlane fields specify the distances from the viewpoint to the near plane and far plane of the visibility area. The texture and depth data shows the area closed by the near plane, far plane and the fieldOfView. The depth data are normalized to the distance from nearPlane to farPlane.

The orthogonal field specifies the view type of the IBR texture. When set to TRUE, the IBR texture is based on orthogonal view. Otherwise, the IBR texture is based on perspective view.

The depthImageUrl field specifies the address of the depth image stream, which may optionally contain the following contents.

position

orientation

fieldOfView

nearPlane

farPlane

orthogonal

diTexture (SimpleTexture or PointTexture)

1 byte header for the on/off flags of the above fields

SimpleTexture { field SFNode texture NULL field SFNode depth NULL }

The SimpleTexture node defines a single layer of IBR texture.

The texture field specifies the flat image that contains color for each pixel. It shall be one of the various types of texture nodes (ImageTexture, MovieTexture or PixelTexture).

The depth field specifies the depth for each pixel in the texture field. The size of the depth map shall be the same size as the image or movie in the texture field. It shall be one of the various types of texture nodes (ImageTexture, MovieTexture or PixelTexture). If the depth node is NULL or the depth field is unspecified, the alpha channel in the texture field shall be used as the depth map.

PointTexture { field SFInt32 width 256 field SFInt32 height 256 field MFInt32 depth

field MFColor color

}

The PointTexture node defines a multiple layers of IBR points.

The width and height field specifies the width and height of the texture. The depth field specifies a multiple depths of each point (in normalized coordinates) in the projected plane in the order of traversal, which starts from the point in the lower left corner and traverses to the right to finish the horizontal line before moving to the upper line. For each point, the number of depths (pixels) is first stored and that number of depth values shall follow.

The color field specifies color of current pixel. The order shall be the same as the depth field except that number of depths (pixels) for each point is not included.

OctreeImage { field SFInt32 octreeresolution 256 field SFString octree “” field MFNode octreeimages

field SFString octreeUrl “” }

The OctreeImage node defines an octree structure and their projected textures. The size of the enclosing cube of the total octree is 1×1×1, and the center of the octree cube shall be the origin (0, 0, 0) of the local coordinate system.

The octreeresolution field specifies maximum number of octree leaves along a side of the enclosing cube. The level of the octree can be determined from octreeresolution using the following equation: octreelevel=int(log 2(octreeresolution−1))+1)

The octree field specifies a set of octree internal nodes. Each internal node is represented by a byte. 1 in ith bit of this byte means that the children nodes exist for the ith child of that internal node, while 0 means that it does not. The order of the octree internal nodes shall be the order of breadth first traversal of the octree. The order of eight children of an internal node is shown in FIG. 2.

The octreeimages field specifies a set of DepthImage nodes with SimpleTexture for diTexture field. However, the nearPlane and farPlane field of the DepthImage node and the depth field in the SimpleTexture node are not used.

The octreeUrl field specifies the address of the octreeImage stream with the following contents.

header for flags

octreeresolution

octree

octreeimages (Multiple DepthImage nodes)

-   -   nearPlane not used     -   farPlane not used     -   diTexture→SimpleTexture without depth

.ISO/IEC JTC 1/SC 29/WG 11 Coding of Moving Pictures and Audio

1. Introduction

In this document, the result of the core experiment on Depth Image-based Rendering (DIBR), AFX A8.3, is reported. This core experiment is for the depth image-based representation nodes that uses textures with depth information. The nodes have been accepted and included in a proposal for Committee Draft during Pattaya meeting. However, the streaming of this information through octreeUrl field of OctreeImage node and depthImageUrl field of DepthImage node still remained on-going. This document describes the streaming format to be linked by these url fields. The streaming format includes the compression of octree field of OctreeImage node and depth/color fields of PointTexture node.

2. Streaming Format for octreeUrl

2.1. Stream Format

The OctreeImage node includes the octreeUrl field, which specifies the address of the octreeImage stream. This stream may optionally contain the following contents.

header for flags

octreeresolution

octree

octreeimages (Multiple DepthImage nodes)

-   -   nearPlane not used     -   farPlane not used     -   diTexture→SimpleTexture without depth

The octree field specifies a set of octree internal nodes. Each internal node is represented by a byte. 1 in ith bit of this byte means that the children nodes exist for the ith child of that internal node, while 0 means that it does not. The order of the octree internal nodes shall be the order of breadth first traversal of the octree. The order of eight children of an internal node is shown in FIG. 2.

The octree field of OctreeImage node is in a compact format. However, this field may be further compressed in order to have efficient streaming. The following section describes the compression scheme for the octree field of OctreeImage node.

2.2. Compression Scheme for Octree Field

In octree representation of DIBR, the data consists of the octree field, which represents the geometry component. Octree is a set of points in the enclosing cube, completely representing the object surface.

Non-identical reconstruction of the geometry from compressed representation leads to highly noticeable artifacts. Hence, geometry must be compressed without loss of information.

2.2.1. Octree Compression

For the compression of octree field represented in the depth-first traversal octree form, we developed a lossless compression method using some ideas of the PPM (Prediction by Partial Matching) approach. The main idea we use is “prediction” (i.e. probability estimation) of the next symbol by several previous symbols that are called ‘context’. For each context, there exists a probability table, containing the estimated probability of occurrence of each symbol in this context. This is used in combination with an arithmetic coder called range coder.

The two main features of the method are:

-   -   1. using parent node as a context for the child node;     -   2. using ‘orthogonal invariance’ assumption to reduce number of         contexts;

The second idea is based on the observation that ‘transition probability’ for pairs of ‘parent-child’ nodes is typically invariant under orthogonal transforms (rotation and symmetry). This assumption is illustrated in Annex 1. This assumption allows us to use more complex context without having too many probability tables. This, in turn, allowed us to achieve quite good results in terms of volume and speed, because the more contexts are used, the sharper is probability estimate, and thus the more compact is the code.

Coding is the process of constructing and updating the probabilistic table according to the context model. In the proposed method, the context is modeled as the parent-child hierarchy in octree structure. First, we define Symbol as a byte node whose bits indicate the occupancy of subcube after internal subdivision. Therefore, each node in octree can be a symbol and its numeric value will be 0-255. The probabilistic table (PT) contains 256 integer values. Value of i-th variable (0≦i≦255), divided by the sum of all the variables, equals to the frequency (estimate of probability) of the i-th symbol occurrence. The Probabilistic Context Table (PCT) is set of PTs. Probability of a symbol is determined from one and only one of the PTs. The number of the particular PT depends on the context. An example of PCT is shown in Table 1.

TABLE 1 Component of a Probabilistic Context Tables (PCT) ID of PTs 0 1 ... 255 Context description  0 P_(0,0) P_(0,1) ... P_(0,255) 0-Context: Context independent  1..27 P_(i,0) P_(i,1) ... P_(i,255) 1-Context: Parent Symbol (27) 28...243 P_(j,0) P_(j,1) ... P_(j,255) 2-Context: Parent Symbol (27*8) and Node Symbol

Coder works as follows. It first uses O-context model (i.e. a single PT for all the symbols, starting from uniform distribution, and updating the PT after each new coded symbol). The tree is traversed in depth-first order. When enough statistics is gathered (empirically found value is 512 coded symbols), the coder switches to 1-context model. It has 27 contexts, which are specified as follows.

Consider a set of 32 fixed orthogonal transforms, which include symmetries and rotations by 90 degrees about the coordinate axes (see Annex 2). Then, we can categorize the symbols according to the filling pattern of their subcubes. In our method, there will be 27 sets of symbols, called groups here, with the following property: 2 symbols are connected by one of these fixed transforms, if and only if they belong to the same group.

In the byte notation the groups are represented by 27 sets of numbers (see Annex 2). We assume that the probability table depends not on the parent node itself (in which case there would have been 256 tables), but only on the group (denoted ParentSymbol in FIG. 2) to which the parent node belongs (hence 27 tables).

At the switching moment, PT's for all the contexts are set to copies of the O-context PT. Then, each of the 27 PTs is updated when it is used for coding.

After 2048 (another heuristic value) symbols are coded in 1-context model, we switch to 2-context model, which uses the pairs (ParentSymbol, NodeSymbol) as contexts. NodeSymbol is simply position of the current node in the parent node. So, we have 27*8 contexts for 2-context model. At the moment of switching to that model, PTs obtained for each context are used for each node ‘inside’ this context, and from this time are updated independently.

In some more technical detail, the encoding for 1-context and 2-context models proceeds as follows. For the context of the current symbol (i.e. the parent node), its group is determined. This is done by table lookup (geometric analysis was performed at the stage of the program development). Then, we apply an orthogonal transform that takes our context into a “standard” (arbitrary selected once and for all) element of the group it belongs to. The same transform is applied to the symbol itself (these operations are also implemented as table lookup, of course—all the computations for all the possible combinations were done in advance). Effectively, this is computation of the correct position of the current symbol in probability table for the group containing its context. Then the corresponding probability is fed to the RangeCoder.

In short, given a parent symbol and subnode position, ContextID is determined which identifies the group ID and the position of PT in PCT. The probability distribution in PT and the ContextID is fed into a range coder. After encoding, PCT is updated to be used in next encoding. Note that the range coder is a variation of arithmetic coding which does renormalization in bytes instead of bits thus running twice faster, and with 0.01% worse compression than a standard implementation of arithmetic coding.

The decoding process is essentially an inverse of the encoding process. This is absolutely standard procedure which needs not to be described, since it uses exactly the same methods of determining the contexts, updating probabilities, etc.

2.3. Test Results

FIG. 3 is a table for comparison of our approach, for both still and animated models (ordinates denote compression ratio). Octree compression ratio varies around 1.5-2 times compared to original octree size, and outperforms general-purpose lossless compressions (Lempel-Ziv based, like RAR program) by as much as 30%.

3. Streaming Format for depthImageUrl

3.1. Stream Format

The DepthImage node includes depthImageUrl field, which specifies the address of the depth image stream. This stream may optionally contain the following contents.

1 byte header for the on/off flags of the fields below

position

orientation

fieldOfView

nearPlane

farPlane

orthogonal

diTexture (SimpleTexture or PointTexture)

The definition of PointTexture node, which can be used in the diTexture field of DepthImage node, is as follows.

PointTexture { field SFInt32 width 256 field SFInt32 height 256 field MFInt32 depth

field MFColor color

}

The PointTexture node defines multiple layers of IBR points. The width and height field specifies the width and height of the texture. The depth field specifies a multiple depths of each point (in normalized coordinates) in the projected plane in the order of traversal, which starts from the point in the lower left corner and traverses to the right to finish the horizontal line before moving to the upper line. For each point, the number of depths (pixels) is first stored and that number of depth values shall follow. The color field specifies color of current pixel. The order shall be the same as the depth field except that number of depths (pixels) for each point is not included.

The depth and color fields of PointTexture are in a raw format, and the size of these fields will most likely be very large. Therefore, these fields need to be compressed in order to have efficient streaming. The following section describes the compression scheme for the fields of PointTexture node.

3.2. Compression Scheme for PointTexture

3.2.1. Compression of depth field

The depth field of PointTexutre node is simply a set of points in a ‘discretized enclosing cube’. We assume the bottom plane to be the plane of projection. Given the m*n*l dimension grids for a model, points being the centers of the cells (in octree case, we call them voxels) of this grid, we can consider occupied voxels as 1's and empty voxels as 0's. The resulting set of bits (m*n*l bits) is then organized in a stream of bytes. This is done by traversing voxels in the depth (orthogonal to projection plane) direction by layers of depth 8, and in usual (“column-wise”) order in the projection plane (padding, if necessary, the last layer of bytes with zeros in case the depth dimension is not a multiple of 8). Thus, we can think of our set of points as of a stack of 8-bit gray scale images (variant—16-bit images). Correspondence of voxels and bits is illustrated in FIG. 4( a).

For example, in FIG. 4( b), black squares correspond to points on the object. Horizontal plane is the projection plane. Consider the ‘slice’ of the height 16 (its upper boundary is shown by thick line). Let us interpret the ‘columns’ as bytes. That is, a column above the point marked in the figure represents the stack of 2 bytes with values 18 and 1 (or a 16-bit unsigned integer 274). If we apply the best available PPM-based compression methods to the union of bytes obtained this way, quite good results are obtained. However, if a simple 1-context method is directly applied here (no orthogonal invariance or hierarchical contexts can be used here, of course), this results in slightly lower degree of compression. Below we give a table of volumes required for different types of LDI geometry representations: BVOC, the above byte array compressed by the best PPM compressor, and the same array compressed by our currently used compressor (figures in Kbytes).

BVOC representation Best PPM Simple 1-context of compression of compression of Model geometry byte array byte array “Angel” 31.4 27.5 32 “Morton” 23.4 23.3 30.5 “Grasshopper” 16.8 17.0 19.7

3.2.2. Compression of Color Field

The color field of PointTexutre node is a set of colors attributed to points of the object. Unlike octree case, color field is in one-to-one correspondence with depth field. The idea is to represent color information as a single image, which could be compressed by one of the known lossy techniques. Cardinality of this image is much smaller than that of reference images in octree or DepthImage case, and it is a substantial motivation for such an approach. The image can be obtained by scanning depth points in this or that natural order.

Consider first the scanning order dictated by our original storage format for LDI (PointTexture)—‘depth-first’ scanning of the geometry. Multipixels are scanned in the natural order across the projection plane, as if they were simple pixels, and points inside the same multipixel are scanned in depth direction. This order of scanning produces a 1D array of colors (1st nonzero multipixel, 2nd nonzero multipixel, etc). As soon as depth is known, colors of points can be successively reconstructed from this array. To make image compression methods applicable, we must 1-1 map this long string onto 2D array. This can be done in many ways.

The approach used in the tests below is so-called “blocky scan”, when the color string is arranged in 8*8 blocks, and arrange those blocks in column-wise order (‘blocky scan’). The resulting image is shown in FIG. 5.

Compression of this image was performed by several methods, including standard JPEG. It turns out that at least for this type of color scan, far better results are obtained when using texture compression method described in [5]. This method is based on adaptive local palletizing of each 8*8 block. It has two modes; 8- and 12-times compression (as compared to ‘raw’ true-color 24-bit per pixel BMP-format). Success of this method in this type of images can be explained exactly from its palette character, which allows us to account for sharp (even non edge-like!) local color variations, arising from ‘mixing’ the points from front and back surfaces (which can differ greatly, as in case of “Angel”). The aim of searching for optimal scan is to reduce these variations as much as possible.

3.3 Test Results

Examples of models in the original and compressed formats are shown in Annex 3. Quality of some models (e.g., Angel) is still not quite satisfactory after compression, while others are very good (‘Grasshopper’). However, we feel that this problem can be solved with the aid of proper scanning. Potentially, even 12-times compression mode could be used, so the overall compression increases still more. Finally, the lossless compression will be improved so as to approach the best PPM-based results in geometry compression.

Here, we give a table of compression ratios.

Ratio for the best Ratio for simple Model PPM method 1-context method “Angel” 7.1 6.7 “Morton” 7.5 6.7 “Grasshopper” 7.8 7.4

4. Conclusion

In this document, the result of the core experiment on Depth Image-based Representation, AFX A8.3, is reported. The DIBR stream has been introduced, which are linked through url fields of DIBR nodes. These streams consist of all the items in the DIBR node together with a flag for each item to make it optional. Also, the compression of octree and PointTexture data are investigated.

Annex 1. Geometric Meaning of the Context Orthogonal Invariance in BVO Compression Algorithm.

Assumption of orthogonal invariance is illustrated in FIG. 6. Consider rotation about the vertical axis by 90 degrees clockwise. Consider the arbitrary filling patterns of the node and its parent before (top picture), and after rotation (bottom picture). Then, two different patterns can be treated as same pattern.

Annex 2. Groups and Transforms.

1. 32 Fixed Orthogonal Transforms.

Each transform is specified by a 5-bit word. Combination of bits is composition of the following basic transforms (i.e., if k-th bit is 1, the corresponding transform is performed)

-   -   1 st bit—swap x and y coordinates;     -   2nd bit—swap y and z coordinates;     -   3rd bit—symmetry in (y-z) plane;     -   4th bit—symmetry in (x-z) plane;     -   5th bit—symmetry in (x-y) plane;

2. 27 Groups.

For each group, here's the order of the group and number of nonzero bits in its elements: NumberOfGroup, QuantityOfGroup and NumberOfFillBits(SetVoxels).

Group order # (nonzero bits in (number of each element of Group elements) the group) 0 1 0 1 8 1 2 8 2 3 4 2 4 12 2 5 24 3 6 6 4 7 8 3 8 8 4 9 4 2 10 24 3 11 16 4 12 8 4 13 24 4 14 24 5 15 4 4 16 16 5 17 8 6 18 2 4 19 8 5 20 4 6 21 2 4 22 8 5 23 12 6 24 4 6 25 8 7 26 1 8

3. Symbols and Transforms.

For each symbol (s), here is the index of the group (g) it belongs to and value of the transform (t) taking it into the ‘standard’ element of the group.

Binary number of symbol maps to the voxel binary coordinates as follows: i-th bit of the number has binary coordinates x=i&1, y=i&(1<<1), z=i&(1<<2).

s 0 1 2 3 4 5 6 7 8 9 10 11 12 13 14 g 0  1 1 2 1 3 4 5  1 4  3  5  2  5  5 t 0  0 4 0 8 0 0 0 12 4  4  4  8  8 12 s 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 g 6  1 2 4 5 4 5 7 8 9 10 10 11 10 12 t 0 16 2 1 1 2 2 0 0 0  0  5  0 10  0 . . . s 241 242 243 244 245 246 247 248 249 250 251 252 253 254 255 g 14 14 17 14 20 23 25 14 23 20 25 17 25 25 26 t 16 20 16 24 16 16 16 28 20 20 20 24 24 28  0 Annex 3. PointTexture Compression Screenshots.

In FIGS. 7, 8, and 9, Geometry compression figures are given for the best PPM-based method.

.Result of Core Experiment on Depth Image-Based Representation (AFX A8.3)

1. Introduction

In this document, the result of the core experiment on Depth Image-based Representation (DIBR), AFX A8.3, is reported. This core experiment is for the depth image-based representation nodes that uses textures with depth information. The nodes have been accepted and included in a proposal for Committee Draft during Pattaya meeting. However, the streaming of this information through OctreeImage node and DepthImage node still remained ongoing. This document describes the streaming format to be linked by these nodes. The streaming format includes the compression of octree field of OctreeImage node and depth/color fields of PointTexture node.

2. Compression of DIBR Formats

We describe here a novel technique for efficient lossless compression of linkless octree data structure, allowing a reduction in the volume of this already compact representation about 1.5-2 times in our experiments. We also suggest several techniques for lossless and lossy compression of the PointTexture format, using intermediate voxel representation in combination with entropy coding and specialized block-based texture compression method [6].

2.1. OctreeImage Compression

The fields of octreeimages and octree in OctreeImage are compressed separately. The described methods have been developed, based on the notion that octree field must be compressed losslessly while some degree of visually acceptable distortion allowed for octreeimages. Octreeimages field are compressed by means of MPEG-4 image compression (for static model), or video compression tools (for animated model).

2.1.1. Octree Field Compression

Octree compression is the most important part of the OctreeImage compression, since it deals with compression of already very compact linkless binary tree representation. However, in our experiments, the method explained below reduced the volume of this structure to about half of the original. In the animated OctreeImage version, Octree field is compressed separately for each 3D frame.

2.1.1.1. Context Model

Compression is performed by a variant of adaptive arithmetic coding (implemented as ‘range encoder’) that makes explicit use of the geometric nature of the data. The Octree is a stream of bytes. Each byte represents a node (i.e., subcube) of the tree, in which its bits indicate the occupancy of the subcube after internal subdivision. The bit pattern is called filling pattern of the node. The described compression algorithm processes bytes one by one, in the following manner.

-   -   A context for the current byte is determined.     -   ‘probability’ (normalized frequency) of occurrence of the         current byte in this context is retrieved from the ‘probability         table’ (PT) corresponding to the context.     -   The probability value is fed to the range encoder.     -   Current PT is updated by adding 1 to the frequency of the         current byte occurrence in the current context (and, if         necessary, renormalized afterwards, see details below).

Thus, coding is the process of constructing and updating the PTs according to the context model. In the context-based adaptive arithmetic coding schemes (such as ‘Prediction with Partial Matching’), context of a symbol is usually a string of several preceding symbols. However, in our case, compression efficiency is increased by exploiting the octree structure and geometric nature of the data. The described approach is based on the two ideas that are apparently new in the problem of octree compression.

A. For the current node, the context is either its parent node, or the pair {parent node, current node position in the parent node};

B. It is assumed that ‘probability’ of the given node occurrence at the particular geometric location in the particular parent node is invariant with respect to a certain set of orthogonal (such as rotations or symmetries) transforms.

Assumption ‘B’ is illustrated in the FIG. 6, for the transform R, which is the rotation by −90° on the x-z plane. The basic notion behind ‘B’ is the observation that probability of occurrence of a particular type of child node in a particular type of parent node should depend only on their relative position. This assumption is confirmed in our experiments, by analysis of probability tables. It allows us to use more complex context without having too many probability tables. This, in turn, helps to achieve quite good results in terms of data size and speed. Note that the more contexts are used, the sharper is the estimated probability, and thus the more compact is the code.

Let us introduce the set of transforms for which we will assume the invariance of probability distributions. In order to apply in our situation, such transforms should preserve the enclosing cube. Consider a set G of the orthogonal transforms in Euclidean space, which are obtained by all compositions in any number and order of the 3 basis transforms (generators) m₁, m₂, and m₃, given by

${m_{1} = \begin{pmatrix} 0 & 1 & 0 \\ 1 & 0 & 0 \\ 0 & 0 & 1 \end{pmatrix}},{m_{2} = \begin{pmatrix} 1 & 0 & 0 \\ 0 & 0 & 1 \\ 0 & 1 & 0 \end{pmatrix}},{m_{3} = \begin{pmatrix} {- 1} & 0 & 0 \\ 0 & 1 & 0 \\ 0 & 0 & 1 \end{pmatrix}}$ where, m₁ and m₂ are reflections to the planes x=y and y=z, respectively, and m₃ is reflection to the plane x=0. One of the classical results of the theory of groups generated by reflections states that G contains 48 distinct orthogonal transforms, and is, in a sense, the maximal group of orthogonal transforms that take the cube into itself (so-called Coxeter group). For example, rotation R in FIG. 1 is expressed through the generators as R=m ₃ ·m ₂ ·m ₁ ·m ₂, where ‘·’ is matrix multiplication.

Transform from G, applied to an octree node, produces a node with different filling pattern of subcubes. This allows us to categorize the nodes according to the filling pattern of their subcubes. Using the group theory language, we say that G acts on the set of all filling patterns of the octree nodes. Computations show that there exist 22 distinct classes (also called orbits in group theory), in which, by definition, two nodes belong to the same class, if and only if they are connected by a transform from G. Number of elements in a class varies from 1 to 24, and is always a divisor of 48.

The practical consequence of ‘B’ is that the probability table depends not on the parent node itself, but only on the class to which the parent node belongs. Note that there would be 256 tables for a parent-based context and additional 256×8=2048 tables for parent-and-child position-based context in former case, while we need only 22 tables for parent-class-based context plus 22×8=176 tables in latter case. Therefore, it is possible to use equivalently complex context with relatively small number of probability tables. The constructed PT would have the form as shown in Table 2.

TABLE 2 Enumeration of probability tables. ID of PTs 0 1 ... 255 Context description  0 P0,0 P0,1 ... P0,255 0-Context: Context independent  1..22 Pi,0 Pi,1 ... Pi,255 1-Context: {parent node (22) class} 23...198 Pj,0 Pj,1 ... Pj,255 2-Context: {parent node (176) class, current node position}

2.1.1.2. Encoding Process

To make the statistics for probability tables more accurate, it is collected in different ways at three stages of encoding process.

-   -   At the first stage we do not use contexts at all, accepting the         ‘0-context model’, and keep a single probability table with 256         entries, starting from the uniform distribution;     -   As soon as the first 512 nodes (it is an empirically found         number) are encoded, we switch to the ‘1-context model’ using         parent node as a context. At the switching moment, the O-context         PT is copied to the PTs for all 22 contexts.     -   After 2048 nodes (another heuristic value) are encoded, we         switch to ‘2-context model’. At this moment, the 1-context PTs         of the parent patterns are copied to the PTs for each position         in the same parent pattern.

Key point of the algorithm is the determination of context and probability for the current byte. This is implemented as follows. In each class we fix a single element, which is called ‘standard element’. We store a class map table (CMT) indicating the class to which each of the possible 256 nodes belongs, and the precomputed transform from G that takes this particular node into the standard element of its class. Thus, in order to determine the probability of the current node N, we perform the following steps:

-   -   Look at the parent P of the current node;     -   Retrieve the class from CMT, to which P belongs, and the         transform T that takes P into the standard node of the class.         Let the class number be c;     -   Apply T to P, and find the child position p in standard node to         which current node N is mapped;     -   Apply T to N. Then, newly obtained filling pattern TN is at the         position p in the standard node of the class c.     -   Retrieve the required probability from the entry TN of the         probability table corresponding to the class-position         combination (c, p).

For the 1-context model, the above steps are modified in an obvious way. Needless to say, all the transforms are precomputed, and implemented in a lookup table.

Note that at the stage of decoding of the node N its parent P is already decoded, and hence transform T is known. All the steps at the stage of decoding are absolutely similar to the corresponding encoding steps.

Finally, let us outline the probability update process. Let P be a probability table for some context. Denote P(N) the entry of P corresponding to the probability of occurrence of the node N in this context. In our implementation, P(N) is an integer, and after each occurrence of N, P(N) is updated as: P(N)=P(N)+A, where A is an integer increment parameter varying typically from 1 to 4 for different context models. Let S(P) be the sum of all entries in P. Then the ‘probability’ of N that is fed to the arithmetic coder (range coder in our case) is computed as P(N)/S(P). As soon as S(P) reaches a threshold value 2¹⁶, all the entries are renormalized: in order to avoid occurrence of zero values in P, entries equal to 1 are left intact, while the others are divided by 2.

2.2. PointTexture Compression

The PointTexture node contains two fields to be compressed, that is, depth and color. The main difficulties with PointTexture data compression are due to the following requirements:

-   -   Geometry must be compressed in a lossless fashion, since         distortions in this type of geometry representation are often         highly noticeable.     -   Color information has no natural 2D structure, and thus image         compression techniques are not immediately applicable.

In this section we suggest three methods for PointTexture model Compression:

-   -   Lossless method for the standard node representation.     -   Lossless method for lower resolution node representation.     -   Lossless geometry and lossy color compression for lower         resolution node representation.

The methods correspond to three levels of ‘fidelity’ of the object description. First method assumes that we must store the depth information up to its original 32 bits precision. However, in practice, the depth information can be often quantized by much smaller number of bits without loss of quality. In particular, when the PointTexture model is converted from polygonal model, the quantization resolution is chosen according to actual size of visible details the original model possesses, as well as to the desirable output screen resolution. In this case 8-11 bits may well satisfy the requirements, and depth values are initially stored in this lower resolution format. Now, our second method deals with lossless compression of this ‘lower resolution’ representation. The key observation here is that for such a relatively small (compared to standard 32) number of bits, an intermediate voxel representation of the model can be used, and allows us to compress the depth field substantially without loss of information. Color information in both cases is losslessly compressed and stored in a PNG format, after arranging the color data as an auxiliary 2D image.

Finally, the third method allows us to achieve much higher compression, combining lossless compression of the geometry with lossy compression of the color data. The latter is performed by a specialized block-based texture compression technique. In the following three subsections the methods are described in full detail.

2.1.1. Lossless PointTexture Compression for the Standard Node Representation

This is simple lossless coding method, which works as follows.

-   -   depth field is compressed by the adaptive range coder, similar         to the one used in Octree field compression. For this format, we         use a version in which probability table is kept for each of         1-symbol contexts, and context is simply the previous byte.         Therefore, 256 PTs are used. The depth field is considered as a         stream of bytes, and geometrical structure is not used         explicitly.     -   color field is compressed after conversion to a planar true         color image. Colors of the points in the PointTexture model are         first written in temporary 1 D array, in the same order as depth         values in depth field. If the total number of points in the         model is L, then we compute the smallest integer I such that         l·l≧L, and ‘wrap’ this long ‘string’ of color values into the         square image with side I (if necessary, padding by black         pixels). This image is then compressed by one of the MPEG-4         lossless image compression tools. In our approach, we used a         Portable Network Graphics (PNG) format. Image obtained in this         way from the ‘Angel’ model is shown in FIG. 10( a).

2.2.2. Lossless PointTexture Compression for the Lower Resolution Node Representation

In many cases 16-bit resolution for depth information is exceedingly fine. In fact, resolution in depth should correspond to resolution of the screen on which the model is to be visualized. In situations where small variations in model depth at different points lead to displacement in the screen plane much smaller than pixel size, it is reasonable to use lower resolution in depth, and models are often represented in the format where depth values occupy 8-11 bits. Such models are usually obtained from other formats, e.g., polygonal model, by discretizing the depth and color values on the proper spatial grid.

Such a reduced resolution representation can itself be considered as a compressed form of standard model with 32-bit depth. However, there exists more compact representation for such models, using the intermediate voxel space. Indeed, points of the model can be assumed to belong to nodes of uniform spatial grid with spacing determined by discretization step. We can always assume that the grid is uniform and orthogonal, since in case of perspective model we can work in parametric space. Using this observation, depth and color fields of lower resolution PointTexture are compressed as follows.

-   -   color field is compressed by a lossless image compression         technique, as in the previous method;     -   depth field is first transformed into voxel representation, and         then compressed by the variant of range coder described in the         previous subsection.

Intermediate voxel model is constructed as follows. According to the depth resolution s of the model, consider the discrete voxel space of the size width×height×2^(s) (‘width’ and ‘height’ parameters are explained in PointTexture specification). For our purposes, we don't need to work with a potentially huge voxel space as a whole, but only with its ‘thin’ cross-sections. Denote (r, c) the row-column coordinates in the projection plane, and let d be depth coordinate. We transform ‘slices’ {c=const}, i.e., cross-sections of the model by ‘vertical planes’, into the voxel representation. Scanning the slice along the ‘columns’ parallel to the projection plane, we set voxel (r, c, d) to ‘black’ if and only if there exists a point of the model with depth value d that projects into (r, c). The process is illustrated in FIG. 4.

As soon as the slice is constructed, it is compressed by the 1-context range coder, and compression of the next slice begins. In this way, we avoid working with very large arrays. Probability tables are not initialized for each new slice. For a wide range of models only a tiny fraction of voxels are black, and this allows us to achieve rather high compression ratio. Decompression is performed by obvious inversion of the described operations.

Comparison of the depth field compression by this method and by the octree representation will be described. Overall compression ratio of the model is determined, however, by the color field, since such an irregular image cannot be strongly compressed without distortions. In the next subsection we consider a combination of lossless geometry and lossy color compression technique.

2.2.3. Lossless Geometry and Lossy Color Compression for Lower Resolution PointTexture Representation

Like the previous one, this method transforms the depth field into the voxel representation, which is then compressed by adaptive 1-context range coder. color field is also mapped onto the 2D image. However, we make an attempt to organize the mapping so that points that are close in 3D space map into nearby points in 2D image plane. Then a specialized texture compression method (adaptive block partitions, ABP) is applied to the resulting image. Main steps of the algorithm are as follows.

-   -   1. Transform a ‘slice’ of four successive ‘vertical planes’ of         the PointTexture model into voxel representation     -   2. Scan the obtained width×4×2^(s) voxel array by:         -   Traversing the vertical ‘plane’ of 4×4×4 voxel subcubes             along the ‘columns’ parallel to the projection plane: first             the column closest to the projection plane, then the next             closest column, etc (i.e., in usual 2D array traversal             order).         -   Traversing voxels inside each 4×4×4 subcube in the order             analogous to the one used in OctreeImage nodes subcubes             traversal.     -   3. Write the colors of points of the model encountered in this         traversal order, into an auxiliary 1D array;     -   4. Rearrange the obtained array of colors into a 2D image, so         that:     -   5. Consecutive 64 color samples are arranged, column-wise, into         8-by-8 pixel block, next 64 samples arranged into adjacent         8-by-8 pixel block, and so on.     -   6. Compress the obtained image by the ABP technique.

This method of scanning 3D array and mapping the result onto the 2D image was chosen from the following considerations. Note that 4×4×4 subcubes and 8×8 image blocks contain the same number of samples. If several successively scanned subcubes contain enough color samples to fill the 8×8 block, it is highly probable that this block will be rather uniform and thus distortion will be hardly noticeable on the 3D model after decompression. ABP algorithm compresses 8×8 blocks independently of one another, with the aid of local palletizing. In our tests, distortion introduced by ABP compression in the final 3D model was drastically smaller than that of JPEG. Another reason for choosing this algorithm was the great speed of decompression (for which it was originally designed). Compression ratio can take two values, 8 and 12. In the PointTexture compression algorithm we fix compression ratio 8.

Unfortunately, this algorithm is not universally applicable. Although the image obtained this way from the color field, shown in FIG. 10( b), is much more uniform than for the ‘natural’ scanning order, sometimes 2D 8×8 blocks may contain color samples corresponding to distant points in 3D space. In this case lossy ABP method may ‘mix’ colors form distant parts of the model, which leads to local but noticeable distortion after decompression.

However, for many models the algorithm works fine. In FIG. 11, we show the ‘bad’ case (‘Angel’ model) and the ‘good’ case (‘Morton256’ model). Reduction of the model volume in both cases is about 7 times.

3. Test Results

In this section we compare the results of compression of two models, ‘Angel’ and ‘Morton256’, in two different formats—OctreeImage and PointTexture. Dimensions of reference images for each model were 256×256 pixels.

3.1. PointTexture Compression

In Table 3˜Table 5, the results of different compression methods are given. Models for this experiment were obtained from models with 8-bit depth field. Depth values were expanded over the (1,2³⁰) range by using quantization step 2²¹+1, so as to make bits distribution in 32-bit depth values more uniform, imitating to some extent ‘true’ 32-bit values.

High compression ratios are not to be expected from this method. Volume reduction is of the same order as for typical lossless compression of true color images. Compressed depth and color fields are of quite comparable size, since geometric nature of the data is not captured by this approach.

Now let us look how much the same models can be losslessly compressed when taken at their ‘true’ depth resolution. Unlike the previous case, depth field is losslessly compressed about 5-6 times. This is due to the intermediate voxel representation that makes the geometric data redundancy much more pronounced—indeed, only a small fraction of voxels are black. However, since uncompressed size of the models is smaller than for 32-bit case, color field compression ratio now determines the overall compression ratio, which is even smaller than for 32-bit case (although the output files are also smaller). So, it is desirable to be able to compress color field at least as good as depth field.

Our third method uses lossy compression technique called ABP [6] for this purpose. This method gives much higher compression. However, like all the lossy compression techniques, it may lead to unpleasant artifacts in some cases. An example of an object for which this happens is ‘Angel’ model. In process of scanning the points of the model, spatially distant points do sometimes drop into the same 2D image block. Colors at distant points of this model can differ very much, and local palletizing cannot provide accurate approximation if there are too many different colors in a block. On the other hand, it is local palletizing that allows us to accurately compress a vast majority of the blocks, for which distortion introduced by, say, standard JPEG becomes absolutely unbearable after the reconstructed colors are put back at their 3D locations. However, visual quality of ‘Morton256’ model compressed by the same method is excellent, and this was the case for most of the models in our experiments.

TABLE 3 Lossless PointTexture compression for the 32-bit depth field (In Bytes). Compression ratio Model depth field color field Total size Depth Color Total “Morton256” Original 691,032 321,666 1,012,698 3.1 1.2 2.0 Compressed 226,385 270,597   424,562 “Angel” Original 665,488 302,508   967,996 3.3 1.2 2.1 Compressed 204,364 262,209   466,604

TABLE 4 Lossless PointTexture compression for the lower resolution node representation (In Bytes). Compression ratio Model depth field color field Total size Depth Color Total “Morton256” Original 172,758 321,666 494,424 5.4 1.2 1.63 Compressed  31,979 270,597 302,576 “Angel” Original 166,372 302,508 468,880 5.2 1.2 1.6 Compressed  32,047 262,209 294,256

TABLE 5 Lossless geometry and lossy color compression for lower resolution PointTexture (In Bytes). Compression ratio Model depth field color field Total size Depth Color Total “Morton256” Original 172,758 321,666 494,424 5.4 8.0 6.8 Compressed  31,979  40,352  72,331 “Angel” Original 166,372 302,508 468,880 5.2 7.9 6.7 Compressed  32,047  38,408  70,455

3.2. OctreeImage Compression

The Table 6 presents sizes of compressed and uncompressed octree components for our two test models. We see that reduction of this field is about 1.6-1.9 times.

However, compared to uncompressed PointTexture models, even with 8-bit depth field, OctreeImage is much more compact. The Table 7 shows compression ratios 7.2 and 11.2. This is more than PointTextures can be compressed without converting to OctreeImage (6.7 and 6.8 times, respectively). However, as we already mentioned, OctreeImage may contain incomplete color information, which is the case with ‘Angel’ model. In such cases 3D interpolation of colors is used.

To sum up, we can conclude that the experiments presented above prove the efficiency of the developed compression tools. Choice of the best tool for given model depends on its geometrical complexity, character of color distribution, required speed of rendering and other factors.

TABLE 6 Compression ratios given by the method described in 4.1.2, for OctreeImage models and their components (file sizes rounded to Kbytes). Model Octree size Compressed Octree size Compression ratio “Angel” 50 31 1.6 “Morton256” 41 22 1.9

TABLE 7 Noncompressed PointTexture (8-bit depth field), and compressed OctreeImage representations for the same models (file sizes rounded to Kbytes). Model PointTexture Compressed OctreeImage Compression ratio “Angel” 469 65  7.2 “Morton256” 494 44 11.2

5. Comments on Study of ISO/IEC 14496-1/PDAM4

After applying following revisions to Study of ISO/IEC 14496-1/PDAM4 (N4627), the revised Study of ISO/IEC 14496-1/PDAM4 should be incorporated into ISO/IEC 14496-1/FPDAM4.

Clause 6.5.3.1.1, Technical

Problem: The default value of orthographic should be the most generally used value.

-   Solution: replace the default value of orthographic field from     “FALSE” to “TRUE” as follows.     Proposed revision:

field SFBool orthographic TRUE

Clause 6.5.3.1.1, Technical

Problem: The streaming of DIBR shall be done with the uniform streaming method for AFX.

Solution: Remove the depthImageUrl field from DepthImage node.

Proposed revision:

DepthImage { field SFVec3f position 0 0 10 field SFRotation orientation 0 0 1 0 field SFVec2f fieldOfView  0.785398 0.785398 field SFFloat nearPlane 10 field SFFloat farPlane 100 field SFBool orthographic TRUE field SFNode diTexture NULL }

Clause 6.5.3.1.2, Editorial

Problem: The term ‘normalized’ is misleading, as applied to the depth field in current context.

Solution: In 5th paragraph, change ‘normalized’ to ‘scaled’.

Proposed revision:

The nearPlane and farPlane fields specify the distances from the viewpoint to the near plane and far plane of the visibility area. The texture and depth data shows the area closed by the near plane, far plane and the fieldOfView. The depth data are scaled to the distance from nearPlane to farPlane.

Clause 6.5.3.1.2, Technical

Problem: The streaming of DIBR shall be done with the uniform streaming method for AFX.

-   Solution: Remove the explanation of depthImageUrl field (the 7th     paragraph and below).     Proposed revision:

Clause 6.5.3.2.2, Editorial

Problem: The semantics of the depth field is incompletely specified.

Solution: Change the depth field specification in the 3rd paragraph as follows.

Proposed revision:

The depth field specifies the depth for each pixel in the texture field. The size of the depth map shall be the same size as the image or movie in the texture field. Depth field shall be one of the various types of texture nodes (ImageTexture, MovieTexture or PixelTexture), where only the nodes representing gray scale images are allowed. If the depth field is unspecified, the alpha channel in the texture field shall be used as the depth map. If the depth map is not specified through depth field or alpha channel, the result is undefined.

Depth field allows us to compute the actual distance of the 3D points of the model to the plane which passes through the viewpoint and parallel to the near plane and far plane:

${{dist} = {{{near}\mspace{14mu}{Plane}} + {\left( {1 - \frac{\mathbb{d}{- 1}}{\mathbb{d}_{\max}{- 1}}} \right)\left( {{{far}\mspace{11mu}{Plane}} - {{near}\mspace{14mu}{Plane}}} \right)}}},$ where d is depth value and d_(max) is maximum allowable depth value. It is assumed that for the points of the model, d>0, where d=1 corresponds to far plane, d=d_(max) corresponds to near plane.

This formula is valid for both perspective and orthographic case, since d is distance between the point and the plane. d_(max) is the largest d value that can be represented by the bits used for each pixel:

-   -   (1) If the depth is specified through depth field, then depth         value d equals to the gray scale.     -   (2) If the depth is specified through alpha channel in the image         defined via texture field, then the depth value d is equal to         alpha channel value.

The depth value is also used to indicate which points belong to the model: only the point for which d is nonzero belong to the model.

For animated DepthImage-based model, only DepthImage with SimpleTextures as diTextures are used.

Each of the Simple Textures can be animated in one of the following ways:

-   -   (1) depth field is still image satisfying the above condition,         texture field is arbitrary MovieTexture     -   (2) depth field is arbitrary MovieTexture satisfying the above         condition on the depth field, texture field is still image     -   (3) both depth and texture are MovieTextures, and depth field         satisfies the above condition     -   (4) depth field is not used, and the depth information is         retrieved from the alpha channel of the MovieTexture that         animates the texture field

Clause 6.5.3.3.2, Editorial

Problem: The semantics of the depth field incompletely specified.

-   Solution: Replace the depth field specification (3rd paragraph) with     the proposed revision.     Proposed revision:

Geometrical meaning of the depth values, and all the conventions on their interpretation adopted for the SimpleTexture, apply here as well.

The depth field specifies a multiple depths of each point in the projection plane, which is assumed to be farPlane (see above) in the order of traversal, which starts from the point in the lower left corner and traverses to the right to finish the horizontal line before moving to the upper line. For each point, the number of depths (pixels) is first stored and that number of depth values shall follow.

Clause 6.5.3.4.1, H.1, Technical

Problem: The field type SFString used for octree field might lead to inconsistent values

Solution: Change the field type for octree field to MFInt32

Proposed revision:

In clause 6.5.3.4.1

field MFInt32 octree “ ”

In clause H.1, table for Octree, change the octree column as follows:

DEF OUT Field name id In id id DYN id [m,M] Q A octree MFInt32 01 [0,255] 13,8

Clause 6.5.3.4.1, Technical

Problem: The streaming of DIBR shall be done with the uniform streaming method for AFX.

Solution: Remove the octreeUrl field from OctreeImage node.

Proposed revision:

OctreeImage { field SFInt32 octreeresolution 256 field MFInt32 octree “” field MFNode octreeimages

}

Clause 6.5.3.4.2, Editorial

Problem: octreeresolution field definition (2nd paragraph) allows misinterpretation.

Solution: Revise the description by adding the word ‘allowed’

Proposed revision:

The octreeresolution field specifies maximum allowable number of octree leaves along a side of the enclosing cube. The level of the octree can be determined from octreeresolution using the following equation: octreelevel=int(log 2(octreeresolution−1))+1)

Clause 6.5.3.4.2, Technical

Problem: The streaming of DIBR shall be done with the uniform streaming method for AFX.

-   Solution: Remove the explanation of octreeUrl field (the 5th     paragraph and below).     Proposed revision:

Clause 6.5.3.4.2, Editorial

Problem: Animation of the OctreeImage was described incompletely

-   Solution: Add a paragraph at the end of clause 6.5.3.4.2 describing     the OctreeImage animation     Proposed revision:

Animation of the Octreeimage can be performed by the same approach as the first three ways of DepthImage-based animation described above, with the only difference of using octree field instead of the depth field.

Clause H.1, Technical

Problem: The range of depth data in PointTexture node may be too small for future applications. Many graphics tools allow 24 bits or 36 bits depth for their z-buffer. However, depth field in PointTexture has the range of [0, 65535], which is 16 bits.

-   Solution: In clause H.1, table for PointTexture, change the range of     depth column as proposed.     Proposed revision:

DEF Field name id In id OUT id DYN id [m,M] Q A Depth MFInt32 10 [0, 1]

.ISO/IEC JTC 1/SC 29/WG 11 Coding of Moving Pictures and Audio

1. Introduction

In this document, an improvement of OctreeImage in Depth Image-Based Representation (DIBR), AFX A8.3, is described. The OctreeImage node has been accepted and included in a proposal for Committee Draft during Pattaya meeting. However, it has been observed that the rendering quality would be unsatisfactory in some special cases, due to the occlusion of object geometry. This document describes the improved version of the OctreeImage node, i.e., Textured Binary Volumetric Octree (TBVO), as well as its compression method for streaming.

2. Textured Binary Volumetric Octree (TBVO)

2.1. TBVO Overview

The objective of TBVO is to contrive a more flexible representation/compression format with fast visualization, as an improvement of the Binary Volumetric Octree (BVO). This is achieved by storing some additional information on the basis of BVO. BVO-based representation consists of (octree structure+set of reference images), while TBVO-based representation consists of (BVO octree structure+set of reference images+camera indices).

The main BVO visualization problem is that we must determine corresponding camera index of each voxel during rendering. To this end, we need not only project to the cameras, but also make reverse ray casting procedure. We must at least determine the existence of a camera, from which the voxel is visible. Therefore, we must find all the voxels that are projected to a particular camera. But this procedure is very slow if we use brute-force approach. We have developed an algorithm that performs it fast and accurate for majority of object shapes. However, there are still some troubles for voxels that is not visible from any cameras.

A possible solution could be storing explicit color to each voxel. However, in this case, we have experienced some problem in compressing color information. That is, if we group voxel colors as an image format and compress it, the color correlation of neighboring voxels is destroyed such that the compression ratio would be unsatisfactory.

In TBVO, the problem is solved by storing camera (image) index for every voxel. The index is usually same for large group of voxels, and this allows the use of octree structure for economic storage of the additional information. Note that, on the average, only 15% volume increase was observed in the experiments with our models. It's modeling is a little bit more complex, but allows more flexible way of representing objects of any geometry.

The advantages of TBVO over BVO are that it's rendering is simpler and much faster than BVO's and virtually no restrictions on the object geometry is imposed

2.2. TBVO Example

In this section, we show a typical example, which illustrates the efficacy and key ingredients of TBVO representation. In FIG. 12( a), a BVO model of “Angel” is shown. Using the usual 6 textures of BVO, a few parts of the body and wing are not observed from any camera, yielding rendered image with a lot of visible ‘cracks’. In TBVO representation of the same model, a total of 8 cameras are used (6 faces of a box+2 additional camera). In FIG. 13, (a) is the image of camera index. Different color denotes the different index of camera. Additional cameras are placed inside the cube, watching the front and back face orthographically. In FIG. 13, (b) and (c) are additional Images taken by the additional cameras. As a result, we have obtained a seamless and clear rendering result of the model, as shown in FIG. 12( b).

2.3. Uncompressed TBVO Stream Description

We suppose that 255 cameras are enough, and assign up to 1 byte for the index. The TBVO stream is stream of symbols. Every TBVO-symbol is BVO-symbol or Texture-symbol. Texture-symbol denotes camera index, which could be a specific number or a code of “undefined”. Let “undefined” code be ‘?’ for further description.

The TBVO stream is traversed in breadth first order. Let us describe how to write TBVO stream if we have BVO and every leaf voxel has camera number. This must be done in modeling stage. It will traverse all BVO nodes including leaf nodes (which do not have BVO-symbol) in breadth first order. The following pseudo-code will complete writing the stream.

If CurNode is not leaf node {   Write current BVO-symbol corresponding to this node } if all the children have identical camera index (texture-symbol) {   if parent of CurNode has ‘?’ camera index     Write camera index equal for sub-nodes } else {   Write ‘?’ symbol }

According to the procedure, for the TBVO tree shown in FIG. 14( a), a stream of symbols can be obtained as shown in FIG. 14( b). In this example, the texture-symbols are represented in byte. However, in the actual stream, each texture-symbol would only need 2 bits because we only need to represent three values (two cameras and the undefined code).

2.4. TBVO Compression

The fields of octreeimages and octree, in OctreeImage node, are compressed separately. The described methods have been developed, based on the notion that octree field must be compressed losslessly while some degree of visually acceptable distortion is allowed for octreeimages.

2.4.1. Octreeimages Field Compression

Octreeimages field is compressed by means of MPEG-4 image compression (for static model), or video compression tools (for animated model) that are allowed in MPEG-4. In our approach, we used the JPEG format for Octreeimages (after some preprocessing which we call ‘minimization’ of the JPEG images, retaining for each texture, only the points necessary for 3D visualization; in other words, the parts of given texture that are never used at 3D rendering stage, can be compressed as roughly as we like).

2.4.2 Octree Field Compression

Octree compression is the most important part of the OctreeImage compression, since it deals with compression of already very compact linkless binary tree representation. However, in our experiments, the method explained below reduced the volume of this structure to about half of the original. In the animated OctreeImage version, octree field is compressed separately for each 3D frame.

2.4.2.1. Context Model

Compression is performed by a variant of adaptive arithmetic coding (implemented as ‘range encoder’) that makes explicit use of the geometric nature of the data. The Octree is a stream of bytes. Each byte represents a node (i.e., subcube) of the tree, in which its bits indicate the occupancy of the subcube after internal subdivision. The bit pattern is called filling pattern of the node. The described compression algorithm processes bytes one by one, in the following manner.

-   -   A context for the current byte is determined.     -   The ‘probability’ (normalized frequency) of occurrence of the         current byte in this context is retrieved from the ‘probability         table’ (PT) corresponding to the context.     -   The probability value is fed to the range encoder.     -   Current PT is updated by adding 1 to the frequency of the         current byte occurrence in the current context (and, if         necessary, renormalized afterwards, see details below).

Thus, coding is the process of constructing and updating the PTs according to the context model. In the context-based adaptive arithmetic coding schemes (such as ‘Prediction with Partial Matching’), context of a symbol is usually a string of several preceding symbols. However, in our case, compression efficiency is increased by exploiting the octree structure and geometric nature of the data. The described approach is based on the two ideas that are apparently new in the problem of octree compression.

-   -   A. For the current node, the context is either its parent node,         or the pair {parent node, current node position in the parent         node};     -   B. It is assumed that ‘probability’ of the given node occurrence         at the particular geometric location in the particular parent         node is invariant with respect to a certain set of orthogonal         (such as rotations or symmetries) transforms.

Assumption ‘B’ is illustrated in the FIG. 6, for the transform R, which is the rotation by −90° on the x-z plane. The basic notion behind ‘B’ is the observation that probability of occurrence of a particular type of child node in a particular type of parent node should depend only on their relative position. This assumption is confirmed in our experiments, by analysis of probability tables. It allows us to use more complex context without having too many probability tables. This, in turn, helps to achieve quite good results in terms of data size and speed. Note that the more contexts are used, the sharper is the estimated probability, and thus the more compact is the code.

Let us introduce the set of transforms for which we will assume the invariance of probability distributions. In order to apply in our situation, such transforms should preserve the enclosing cube. Consider a set G of the orthogonal transforms in Euclidean space, which are obtained by all compositions in any number and order of the 3 basis transforms (generators) m₁, m₂ and m₃, given by

${m_{1} = \begin{pmatrix} 0 & 1 & 0 \\ 1 & 0 & 0 \\ 0 & 0 & 1 \end{pmatrix}},{m_{2} = \begin{pmatrix} 1 & 0 & 0 \\ 0 & 0 & 1 \\ 0 & 1 & 0 \end{pmatrix}},{m_{3} = \begin{pmatrix} {- 1} & 0 & 0 \\ 0 & 1 & 0 \\ 0 & 0 & 1 \end{pmatrix}}$ where, m₁ and m₂ are reflections to the planes x=y and y=z, respectively, and m₃ is reflection to the plane x=0. One of the classical results of the theory of groups generated by reflections states that G contains 48 distinct orthogonal transforms, and is, in a sense, the maximal group of orthogonal transforms that take the cube into itself (so-called Coxeter group). For example, rotation R in FIG. 6 is expressed through the generators as R=m ₃ ·m ₂ ·m ₁ ·m ₂, where ‘·’ is matrix multiplication.

Transform from G, applied to an octree node, produces a node with different filling pattern of subcubes. This allows us to categorize the nodes according to the filling pattern of their subcubes. Using the group theory language [5], we say that G acts on the set of all filling patterns of the octree nodes. Computations show that there exist 22 distinct classes (also called orbits in group theory), in which, by definition, two nodes belong to the same class, if and only if they are connected by a transform from G. Number of elements in a class varies from 1 to 24, and is always a divisor of 48.

The practical consequence of assumption ‘B’ is that the probability table depends not on the parent node itself, but only on the class to which the parent node belongs. Note that there would be 256 tables for a parent-based context and additional 256×8=2048 tables for parent-and-child position-based context in former case, while we need only 22 tables for parent-class-based context plus 22×8=176 tables in latter case. Therefore, it is possible to use equivalently complex context with relatively small number of probability tables. The constructed PT would have the form as shown in Table 8.

TABLE 8 Enumeration of probability tables. ID of PTs 0 1 ... 255 Context description  0 P0,0 P0,1 ... P0,255 0-Context: Context independent  1..22 (22) Pi,0 Pi,1 ... Pi,255 1-Context: {parent node class} 23...198 Pj,0 Pj,1 ... Pj,255 2-Context: {parent node class, (176) current node position}

2.4.2.2. Encoding Process

To make the statistics for probability tables more accurate, it is collected in different ways at three stages of encoding process.

-   -   At the first stage we do not use contexts at all, accepting the         ‘0-context model’, and keep a single probability table with 256         entries, starting from the uniform distribution;     -   As soon as the first 512 nodes (it is an empirically found         number) are encoded, we switch to the ‘1-context model’ using         parent node as a context. At the switching moment, the O-context         PT is copied to the PTs for all 22 contexts.     -   After next 2048 nodes (another heuristic value) are encoded, we         switch to ‘2-context model’. At this moment, the 1-context PTs         of the parent patterns are copied to the PTs for each position         in the same parent pattern.

Key point of the algorithm is the determination of context and probability for the current byte. This is implemented as follows. In each class we fix a single element, which is called ‘standard element’. We store a class map table (CMT) indicating the class to which each of the possible 256 nodes belongs, and the precomputed transform from G that takes this particular node into the standard element of its class. Thus, in order to determine the probability of the current node N, we perform the following steps:

-   -   Look at the parent P of the current node;     -   Retrieve the class from CMT, to which P belongs, and the         transform T that takes P into the standard node of the class.         Let the class number be c;     -   Apply T to P, and find the child position p in standard node to         which current node N is mapped;     -   Apply T to N. Then, newly obtained filling pattern TN is at the         position p in the standard node of the class c.     -   Retrieve the required probability from the entry TN of the         probability table corresponding to the class-position         combination (c, p).

For the 1-context model, the above steps are modified in an obvious way. Needless to say, all the transforms are precomputed, and implemented in a lookup table.

Note that at the stage of decoding of the node N, its parent P is already decoded, and hence transform T is known. All the steps at the stage of decoding are absolutely similar to the corresponding encoding steps.

Finally, let us outline the probability update process. Let P be a probability table for some context. Denote P(N) the entry of P corresponding to the probability of occurrence of the node N in this context. In our implementation, P(N) is an integer, and after each occurrence of N, P(N) is updated as: P(N)=P(N)+A, where A is an integer increment parameter varying typically from 1 to 4 for different context models. Let S(P) be the sum of all entries in P. Then the ‘probability’ of N that is fed to the arithmetic coder (range coder in our case) is computed as P(N)/S(P). As soon as S(P) reaches a threshold value 2¹⁶, all the entries are renormalized: in order to avoid occurrence of zero values in P, entries equal to 1 are left intact, while the others are divided by 2.

2.4.2.3 Encoding of the ‘Camera Nodes’

The stream of symbols determining the texture (camera) numbers for each voxel, is compressed using its own probability table. In the terms used above, it has a single context. PT entries are updated with larger increment than entries for octree nodes; in the rest, there's no difference with node symbols coding.

2.5. Results of TBVO Compression and Rendering

FIGS. 15, 17, 18, and 19 are the results of TBVO compression. In FIG. 16, peeled images of “Angel” and “Morton” models are illustrated. The compressed size is compared with the compressed BVO: in the third column the number in brackets is compressed geometry volume, while the first number is total volume of TBVO-based compressed model (i.e. textures are taken into account). As a measure of visual distortion, PSNR was computed to estimate the color difference after LDI→(T)BVO→LDI transform. Compressed model size is size of all the textures (stored as minimized JPEGs, see 0), plus compressed geometry size. In TBVO case, compressed geometry includes also camera information. The PSNR of TBVO is improved significantly compared with BVO.

TBVO achieves faster rendering than BVO. For the “Angel” model, the frame rate of TBVO-12 is 10.8 fps, while that of BVO is 7.5. For the “Morton” model, TBVO-12 is 3.0 fps, while BVO is 2.1 (on Celeron 850 MHz). On the other hand, it is observed that the rendering is accelerated much further in animated TBVO. For the “Dragon” model, the frame rate of TBVO-12 is 73 fps, while that of BVO is 29 fps (on Pentium IV 1.8 GHz).

A TBVO format provides great flexibility. For example, 2 ways of using 12 cameras are illustrated in FIG. 6—TBVO-12 and TBVO-(6+6). TBVO-12 uses 6 BVO cameras (cube faces) plus 6 images taken from the cube center, and parallel to the faces. (6+6) configuration uses 6 BVO cameras, and then it removes (‘peels’) all the voxels visible by these cameras and ‘photographs’ the parts that became visible by the same 6 cameras. Examples of such images are shown in FIG. 16.

Note the drastic difference in quality (subjective and PSNR value) between BVO and TBVO-6 Angel models. Although the same camera locations are used, TBVO allows us to assign camera numbers to all the voxels, even those invisible from all the cameras. These numbers are chosen so as to best match the original colors (i.e. for each point the best color match in all the ‘camera images’ is selected, regardless of direct visibility. In the Angel case it gives great result).

Note also the very modest ‘geometry’ (i.e. BVO+cameras) volume difference between 6 and 12 camera cases. In fact, additional cameras cover, typically, small regions, and thus their identifiers are rare, and their textures are sparse (and well compressed). All this applies not only to ‘Angel’, but also to ‘Morton’, ‘Palm512’, and ‘robots512’.

2.6. Node Specification

OctreeImage { field SFInt32 octreeresolution 256 field MFInt32 octree

#%q=13,8 field MFInt32 cameraID

#%q=13,8 field MFNode octreeimages

}

The OctreeImage node defines a TBVO structure, in which an octree structure, corresponding camera index array, and a set of octreeimages exist.

The octreeimages field specifies a set of DepthImage nodes with SimpleTexture for diTexture field; depth field in these SimpleTexture nodes is not used. The orthographic field must be TRUE for the DepthImage nodes. For each of SimpleTexture, texture field stores the color information of the object, or part of the object view (for example, its cross-section by a camera plane) as obtained by the orthographic camera whose position and orientation are specified in the corresponding fields of DepthImage. Parts of the object corresponding to each camera are assigned at the stage of model construction. The object partitioning, using the values of position, orientation, and texture fields, is performed so as to minimize the number of cameras (or, equivalently, of the involved octreeimages), at the same time to include all the object parts potentially visible from an arbitrary chosen position. The orientation fields must satisfy the condition: camera view vector has only one nonzero component (i.e., is perpendicular to one of the enclosing cube faces). Also, sides of the SimpleTexture image must be parallel to corresponding sides of enclosing cube.

The octree field completely describes object geometry. Geometry is represented as a set of voxels that constitutes the given object. An octree is a tree-like data structure, in which each node is represented by a byte. 1 in ith bit of this byte means that the children nodes exist for the ith child of that internal node; while 0 means that it does not. The order of the octree internal nodes shall be the order of breadth first traversal of the octree. The order of eight children of an internal node is shown in FIG. 14( b). The size of the enclosing cube of the total octree is 1×1×1, and the center of the octree cube shall be the origin (0, 0, 0) of the local coordinate system.

The cameraID field contains an array of camera indices assigned to voxels. At the rendering stage, color attributed to an octree leave is determined by orthographically projecting the leave onto one of the octreeimages with a to particular index. The indices are stored in a octree-like fashion: if a particular camera can be used for all the leaves contained in a specific node, the node containing index of the camera is issued into the stream; otherwise, the node containing a fixed ‘further subdivision’ code is issued, which means that camera index will be specified separately for the child subnodes of the current node (in the same recursive fashion). If the cameraID is empty, then the camera indices are determined during rendering stage (as in BVO case).

The octreeresolution field specifies maximum allowable number of octree leaves along a side of the enclosing cube. The level of the octree can be determined from octreeresolution using the following equation: octreelevel=┌log₂(octreeresolution)┐

2.7. Bitstream Specification

2.7.1. Octree Compression

2.7.1.1. Overview

The OctreeImage node in Depth Image-Based Representation defines the octree structure and their projected textures. Each texture, stored in the octreeImages array, is defined through DepthImage node with SimpleTexture. The other fields of the OctreeImage node can be compressed by octree compression.

2.7.1.2. Octree

2.7.1.2.1. Syntax

class Octree ( ) {   OctreeHeader ( );   aligned bit (32)*  next;   while (next == 0x000001C8)   {     aligned bit (32) octree_frame_start_code;     OctreeFrame(octreeLevel);     aligned bit (32)* next;   } }

2.7.1.2.2. Semantics

The compressed stream of the octree contains an octree header and one or more octree frame, each preceded by octree_frame_start_code. The value of the octree_frame_start_code is always 0x000001C8. This value is detected by look-ahead parsing (next) of the stream.

2.7.1.3. OctreeHeader

2.7.1.3.1. Syntax

class OctreeHeader ( ) {   unsigned int (5) octreeResolutionBits;   unsigned int (octreeResolutionBits) octreeResolution;   int octreeLevel = ceil(log(octreeResolution)/log(2));   unsigned int (3) textureNumBits;   unsigned int (textureNumBits) numOfTextures; }

2.7.1.3.2. Semantics

This class reads the header information for the octree compression.

The octreeResolution, which length is described by octreeResolutionBits, contains the value of octreeResolution field of OctreeImage node. This value is used to derive the octree level.

The numOfTextures, which is textureNumBits long, describes the number of textures (or cameras) used in the OctreeImage node. This value is used for the arithmetic coding of camera ID for each node of the octree. If the value of textureNumBits is 0, then the texture symbols are not coded by setting the curTexture of the root node to 255.

2.7.1.4. OctreeFrame

2.7.1.4.1. Syntax

class OctreeFrame (int octreeLevel) {  for (int curLevel=0; curLevel < octreeLevel; curLevel++0  {   for (int nodelndex=0; nodeIndex < nNodesInCurLevel; nodeIndex++)   {    int nodeSym = ArithmeticDecodeSymbol (contextID);    if (curTexture == 0)    {     curTexture = ArithmeticDecodeSymbol (textureContextID);    }   }  }  for (int nodeIndex=0; nodeIndex < nNodesInCurLevel; nodeIndex++)   if (curTexture == 0)    curTexture = ArithmeticDecodeSymbol (textureContextID); }

2.7.1.4.2. Semantics

This class reads a single frame of octree in a breadth first traversal order. Starting from 1st node in the level 0, after reading every node in the current level, the number of nodes in the next level is known by counting all the 1's in each node symbol. In the next level, that number of nodes (nNodesInCurLevel) will be read from the stream.

For decoding of each node, an appropriate contextID is given, as described in clause 2.7.1.6.

If the texture (or camera) ID for the current node (curtexture) is not defined by the parent node, then the texture ID is also read from the stream, using the context for texture ID, defined by textureContextID. If a non-zero value is retrieved (the texture ID is defined), then this value will also be applied to all the children nodes in the following levels. After decoding every node, the textureID will be assigned to the leaf nodes of the octree that still have not been assigned the textureID value.

2.7.1.5. Adaptive Arithmetic Decoding

In this section, the adaptive arithmetic coder used in octree compression is described, using the C++ style syntactic description. aa_decode( ) is the function, which decodes a symbol, using a model specified through the array cumul_freq

and PCT is an array of probability context tables, as described in clause 2.7.1.6.

   int ArithmeticDecodeSymbol (int contextID) {  unsigned int MAXCUM = 1<<13;  unsigned int TextureMAXCUM = 256;  int *p, allsym, maxcum;  if (contextID != textureContextID)  {   p = PCT[contextID];   allsym = 256;   maxcum = MAXCUM;  }  else  {   p = TexturePCT;   allsym = numOfTextures;   maxcum = TextureMAXCUM;  }  int cumul_freq[allsym];  int cum=0;  for (int i=allsym−1; i>=0; i−−)  {   cum += p[i];   cumul_freq[i] = cum;  }  if (cum > maxcum)  {   cum=0;   for (int i=allsym−1; i>=0; i−−)    {     PCT[contextID][i] = (PCT[contextID][i]+1)/2;     cum += PCT[contextID][i];     cumul_freq[i] = cum;    }   }   return aa_decode(cumul_freq);  }

2.7.1.6. Decoding Process

The overall structure of decoding process is described in clause 0 (see also encoding process description above). It shows how one obtains the TBVO nodes from the stream of bits that constitute the arithmetically encoded (compressed) TBVO model.

At each step of decoding process we must update the context number (i.e. the index of probability table we use), and the probability table itself. We call Probabilistic model the union of all probability tables (integer arrays). j-th element of i-th probability table, divided by the sum of its elements, estimate the probability of occurrence of the j-th symbol in i-th context.

The process of updating the probability table is as follows. At the start, probability tables are initialized so that all the entries are equal to 1. Before to decoding a symbol, the context number (ContextID) must be chosen. ContextID is determined from previously decoded data, as indicated in 0 and 0 below. When ContextID is obtained, the symbol is decoded using binary arithmetic decoder. After that, the probability table is updated, by adding adaptive step to the decoded symbol frequency. If the total (cumulative) sum of table elements becomes greater than cumulative threshold, than the normalization is performed (see 2.7.1.5.1).

2.7.1.6.1. Context Modeling of Texture Symbol

Texture symbol is modeled with only one context. This means that only one probability table is used. The size of this table is equal to number numOfTextures plus one. At the start, this table is initialized to all ‘1’-s. The maximum allowable entry value is set to 256. The adaptive step is set to 32. This combination of parameter values allows adapting to highly variable stream of the texture numbers.

2.7.1.6.2. Context Modeling of Node Symbol

There are 256 different node symbols, each symbol representing a 2×2×2 binary voxel array. 3D orthogonal transformation may be applied to these arrays, transforming the corresponding symbols into each other.

Consider a set of 48 fixed orthogonal transforms, that is, rotations by 90*n (n=0, 1, 2, 3) degrees about the coordinate axes, and symmetries. Their matrices are given below, in the order of their numbers:

$\begin{matrix} {{{Orthogonal}\mspace{14mu}{{Transforms}\mspace{14mu}\lbrack 48\rbrack}} = \begin{matrix} \left\{ {\begin{pmatrix} 1 & 0 & 0 \\ 0 & 1 & 0 \\ 0 & 0 & 1 \end{pmatrix},} \right. & {\begin{pmatrix} 0 & 1 & 0 \\ 1 & 0 & 0 \\ 0 & 0 & 1 \end{pmatrix},} & {\begin{pmatrix} 1 & 0 & 0 \\ 0 & 0 & 1 \\ 0 & 1 & 0 \end{pmatrix},} & {\begin{pmatrix} {- 1} & 0 & 0 \\ 0 & 1 & 0 \\ 0 & 0 & 1 \end{pmatrix},} & {\begin{pmatrix} 0 & 1 & 0 \\ 0 & 0 & 1 \\ 1 & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & {- 1} & 0 \\ 1 & 0 & 0 \\ 0 & 0 & 1 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & 1 \\ 1 & 0 & 0 \\ 0 & 1 & 0 \end{pmatrix},} & {\begin{pmatrix} {- 1} & 0 & 0 \\ 0 & 0 & 1 \\ 0 & 1 & 0 \end{pmatrix},} \\ {\begin{pmatrix} 0 & 0 & 1 \\ 0 & 1 & 0 \\ 1 & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & {- 1} \\ 1 & 0 & 0 \\ 0 & 1 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 1 & 0 \\ {- 1} & 0 & 0 \\ 0 & 0 & 1 \end{pmatrix},} & {\begin{pmatrix} 0 & 1 & 0 \\ 0 & 0 & 1 \\ {- 1} & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & {- 1} & 0 \\ {- 1} & 0 & 0 \\ 0 & 0 & 1 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & 1 \\ {- 1} & 0 & 0 \\ 0 & 1 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & 1 \\ 0 & 1 & 0 \\ {- 1} & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & {- 1} \\ {- 1} & 0 & 0 \\ 0 & 1 & 0 \end{pmatrix},} \\ {\begin{pmatrix} 0 & {- 1} & 0 \\ 0 & 0 & 1 \\ 1 & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & {- 1} \\ 0 & 1 & 0 \\ 1 & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & 1 \\ 0 & {- 1} & 0 \\ 1 & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & 1 \\ 1 & 0 & 0 \\ 0 & {- 1} & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & {- 1} \\ 0 & {- 1} & 0 \\ 1 & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 1 & 0 & 0 \\ 0 & {- 1} & 0 \\ 0 & 0 & 1 \end{pmatrix},} & {\begin{pmatrix} 1 & 0 & 0 \\ 0 & 0 & 1 \\ 0 & {- 1} & 0 \end{pmatrix},} & {\begin{pmatrix} {- 1} & 0 & 0 \\ 0 & {- 1} & 0 \\ 0 & 0 & 1 \end{pmatrix},} \\ {\begin{pmatrix} 1 & 0 & 0 \\ 0 & 0 & {- 1} \\ 0 & 1 & 0 \end{pmatrix},} & {\begin{pmatrix} 1 & 0 & 0 \\ 0 & 1 & 0 \\ 0 & 0 & {- 1} \end{pmatrix},} & {\begin{pmatrix} {- 1} & 0 & 0 \\ 0 & 0 & {- 1} \\ 0 & 1 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 1 & 0 \\ 0 & 0 & {- 1} \\ 1 & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 1 & 0 \\ 1 & 0 & 0 \\ 0 & 0 & {- 1} \end{pmatrix},} & {\begin{pmatrix} 0 & {- 1} & 0 \\ 0 & 0 & {- 1} \\ 1 & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} {- 1} & 0 & 0 \\ 0 & 0 & 1 \\ 0 & {- 1} & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & {- 1} \\ 1 & 0 & 0 \\ 0 & {- 1} & 0 \end{pmatrix},} \\ {\begin{pmatrix} 0 & 0 & 1 \\ {- 1} & 0 & 0 \\ 0 & {- 1} & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & 1 \\ 0 & {- 1} & 0 \\ {- 1} & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & {- 1} \\ {- 1} & 0 & 0 \\ 0 & {- 1} & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & {- 1} & 0 \\ 0 & 0 & 1 \\ {- 1} & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & {- 1} & 0 \\ 1 & 0 & 0 \\ 0 & 0 & {- 1} \end{pmatrix},} & {\begin{pmatrix} 1 & 0 & 0 \\ 0 & 0 & {- 1} \\ 0 & {- 1} & 0 \end{pmatrix},} & {\begin{pmatrix} 1 & 0 & 0 \\ 0 & {- 1} & 0 \\ 0 & 0 & {- 1} \end{pmatrix},} & {\begin{pmatrix} {- 1} & 0 & 0 \\ 0 & 0 & {- 1} \\ 0 & {- 1} & 0 \end{pmatrix},} \\ {\begin{pmatrix} 0 & 0 & {- 1} \\ 0 & {- 1} & 0 \\ {- 1} & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 0 & {- 1} \\ 0 & 1 & 0 \\ {- 1} & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} {- 1} & 0 & 0 \\ 0 & {- 1} & 0 \\ 0 & 0 & {- 1} \end{pmatrix},} & {\begin{pmatrix} 0 & {- 1} & 0 \\ 0 & 0 & {- 1} \\ {- 1} & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & {- 1} & 0 \\ {- 1} & 0 & 0 \\ 0 & 0 & {- 1} \end{pmatrix},} & {\begin{pmatrix} 0 & 1 & 0 \\ 0 & 0 & {- 1} \\ {- 1} & 0 & 0 \end{pmatrix},} & {\begin{pmatrix} 0 & 1 & 0 \\ {- 1} & 0 & 0 \\ 0 & 0 & {- 1} \end{pmatrix},} & \left. \begin{pmatrix} {- 1} & 0 & 0 \\ 0 & 1 & 0 \\ 0 & 0 & {- 1} \end{pmatrix} \right\} \end{matrix}} & \; \end{matrix}$

There are 22 sets of symbols—called classes,—such that 2 symbols are connected by such a transform if and only if they belong to the same class. The coding method constructs PCT's as follows: ContextID of a symbol equals either to the number of class to which its parent belongs, or to a combined number (parent class, current node position in the parent node). This allows a great reduction in the number of contexts, reducing the time needed to gain meaningful statistics.

For each class, a single base symbol is determined (see Table II), and for each symbol, the orthogonal transform that takes it into the base symbol of its class is precomputed (in actual encoding/decoding process, look-up table is used). After the ContexID for a symbol is determined, the transform, inverse (i.e. transposed matrix) to the one taking its parent into the base element is applied. In Table 9, contexts and the corresponding direct transforms for each symbol are given.

TABLE 9 Example of base symbol for each class Class order Example of base (Number of Class symbol elements) 0 0 1 1 1 8 2 3 12 3 6 12 4 7 24 5 15 6 6 22 8 7 23 8 8 24 4 9 25 24 10 27 24 11 30 24 12 31 24 13 60 6 14 61 24 15 63 12 16 105 2 17 107 8 18 111 12 19 126 4 20 127 8 21 255 1

The context model depends on the number N of already decoded symbols:

For N<512 there is only one context. Probability table is initialized to all ‘1’-s. Number of symbols in probability table is 256. Adaptive step is 2. Maximum cumulative frequency is 8192.

For 512□N<2560 (=2048+512), 1-context (in the sense that context number is single parameter, number of the class) model is used. This model uses 22 PCT's. ContextID is number of the class to which the parent of the decoded node belongs. This number can always be determined from the lookup table (see Table III), because the parent is decoded earlier than the child. Each of the 22 PCT's is initialized by the PCT from previous stage. Number of symbols in each probability table is 256. Adaptive step is 3. Maximum cumulative frequency is also 8192. After symbol is decoded it is transformed using inverse orthogonal transform defined above. The orthogonal transform number can be found in Table III with Node Symbol ID equal to parent of the current node symbol.

When 2560 symbols are decoded, the decoder switches to 2-context (in the sense that context number is now composed of the two parameters as explained below). This model uses 176 (=22*8, i.e. 22 classes by 8 positions) PCT's. ContextID here depends on the parent class and the position of the current node in the parent node. Initial probability tables for this model depend only on its context, but not position: for all 8 positions PCT is a clone of the PCT obtained for the given class at the previous stage. Number of symbols in each probability table is 256. Adaptive step is 4. Maximum cumulative frequency is also 8192.

After symbol is decoded it is also transformed using the inverse orthogonal transform (to the one given in the Table III) as is in the previous model.

One can easily obtain the geometry of base elements for each class, using the Table 10. Base elements are exactly the symbols for which the Transform ID is 0 (number 0 is assigned to the identical transform).

TABLE 10 Joint look up table for node symbol, its class number and orthogonal transform that takes the symbol to the fixed base element of this class Node Orthogonal Symbol Class Transform ID ID ID 0 0 0 1 1 0 2 1 3 3 2 0 4 1 10 5 2 1 6 3 0 7 4 0 8 1 12 9 3 3 10 2 5 11 4 3 12 2 21 13 4 10 14 4 12 15 5 0 16 1 11 17 2 4 18 3 2 19 4 2 20 3 6 21 4 6 22 6 0 23 7 0 24 8 0 25 9 0 26 9 7 27 10 0 28 9 13 29 10 1 30 11 0 31 12 0 32 1 30 33 3 7 34 2 16 35 4 7 36 8 2 37 9 2 38 9 3 39 10 2 40 3 9 41 6 3 42 4 9 43 7 3 44 9 15 45 11 3 46 10 5 47 12 3 48 2 22 49 4 11 50 4 30 51 5 2 52 9 14 53 10 4 54 11 2 55 12 2 56 9 31 57 11 7 58 10 16 59 12 7 60 13 0 61 14 0 62 14 3 63 15 0 64 1 32 65 3 13 66 8 6 67 9 6 68 2 18 69 4 13 70 9 10 71 10 6 72 3 24 73 6 10 74 9 26 75 11 10 76 4 24 77 7 10 78 10 21 79 12 10 80 2 19 81 4 14 82 9 11 83 10 8 84 4 32 85 5 6 86 11 6 87 12 6 88 9 37 89 11 13 90 13 1 91 14 1 92 10 18 93 12 13 94 14 10 95 15 1 96 3 25 97 6 11 98 9 36 99 11 11 100 9 38 101 11 14 102 13 4 103 14 4 104 6 34 105 16 0 106 11 34 107 17 0 108 11 39 109 17 1 110 14 20 111 18 0 112 4 25 113 7 11 114 10 22 115 12 11 116 10 19 117 12 14 118 14 11 119 15 4 120 11 42 121 17 4 122 14 31 123 18 2 124 14 37 125 18 6 126 19 0 127 20 0 128 1 34 129 8 9 130 3 15 131 9 9 132 3 26 133 9 24 134 6 12 135 11 12 136 2 20 137 9 12 138 4 15 139 10 9 140 4 26 141 10 23 142 7 12 143 12 12 144 3 36 145 9 25 146 6 30 147 11 30 148 6 32 149 11 32 150 16 3 151 17 3 152 9 42 153 13 16 154 11 31 155 14 16 156 11 37 157 14 18 158 17 5 159 18 3 160 2 31 161 9 30 162 4 31 163 10 17 164 9 39 165 13 5 166 11 15 167 14 5 168 4 34 169 11 9 170 5 9 171 12 9 172 10 20 173 14 12 174 12 15 175 15 5 176 4 36 177 10 25 178 7 30 179 12 30 180 11 38 181 14 19 182 17 16 183 18 7 184 10 31 185 14 35 186 12 31 187 15 16 188 14 39 189 19 3 190 18 9 191 20 3 192 2 37 193 9 32 194 9 34 195 13 21 196 4 37 197 10 27 198 11 26 199 14 21 200 4 39 201 11 24 202 10 29 203 14 23 204 5 24 205 12 24 206 12 26 207 15 21 208 4 38 209 10 28 210 11 36 211 14 22 212 7 32 213 12 32 214 17 18 215 18 13 216 10 37 217 14 33 218 14 34 219 19 10 220 12 37 221 15 18 222 18 24 223 20 10 224 4 42 225 11 25 226 10 34 227 14 30 228 10 38 229 14 32 230 14 40 231 19 11 232 7 34 233 17 20 234 12 34 235 18 15 236 12 39 237 18 26 238 15 20 239 20 12 240 5 25 241 12 25 242 12 36 243 15 22 244 12 38 245 15 19 246 18 25 247 20 11 248 12 42 249 18 36 250 15 31 251 20 30 252 15 37 253 20 32 254 20 34 255 21 0

Hereinafter, MPEG-4 node specification and compression techniques of octree image formats used in the depth image-based 3D representing apparatus and method according to the present invention will be described in detail.

This invention describes a family of data structures, depth image-based representations (DIBR), that provide effective and efficient representations based mostly on images and depth maps, fully utilizing the advantages described above. Let us briefly characterize main DIBR formats—SimpleTexture, PointTexture, and OctreeImage.

FIG. 20 is a diagram of an example of the relief texture image and depth map, and FIG. 21 is a diagram of an example of Layered depth image (LDI). (a) shows Projection of the object and (b) shows layered pixels.

SimpleTexture is a data structure that consists of an image, corresponding depth map, and camera description (its position, orientation and type, orthogonal or perspective). Representation capabilities of a single SimpleTexture are restricted to objects like façade of a building: a frontal image with depth map allows reconstruction of façade views at substantial range of angles. However, collection of SimpleTextures produced by properly positioned cameras allows representation of the whole building—in case reference images cover all the potentially visible parts of the building surface. Of course, the same applies to trees, human figures, cars, etc. Moreover, union of SimpleTextures provides quite natural means for handling 3D animated data. In this case reference images are replaced with reference videostreams. Depth maps for each 3D frame can be represented either by alpha-channel values of these videostreams, or by separate gray-scale videostreams. In this type of representation, images can be stored in lossy compressed formats like, say, JPEG. This significantly reduces the volume of the color information, especially in animated case. However, geometry information (depth maps) should be compressed losslessly, which affects the overall reduction in storage.

For the objects of complex shape, it is sometimes difficult to cover the whole visible surface with reasonable number of reference images. Preferable representation for such cases might be PointTexture. This format also stores reference image and depth map, but in this case both are multivalued: for each line of sight provided by the camera (orthographic or perspective), color and distance are stored for every intersection of the line with the object. Number of intersections may vary from line to line. Union of several PointTextures provides a very detailed representation even for complex objects. But the format lacks most of 2D regularity of SimpleTexture, and thus have no natural image-based compressed form. For the same reason it is only used for still objects.

OctreeImage format occupies an intermediate position between ‘mostly 2D’ SimpleTexture and ‘mostly 3D’ PointTexture: it stores geometry of the object in the octree-structured volumetric representation (hierarchically organized voxels of usual binary subdivision of enclosing cube), while the color component is represented by a set of images. This format contains also additional octree-like data structure, which stores, for each leaf voxel, the index of a reference image containing its color. At the stage of rendering of the OctreeImage, color of the leaf voxel is determined by orthographically projecting it on the corresponding reference image. We have developed a very efficient compression method for the geometry part of OctreeImage. It is a variant of adaptive context-based arithmetic coding, where the contexts are constructed with the explicit usage of geometric nature of the data. Usage of the compression together with lossy compressed reference images makes OctreeImage a very space-efficient representation. Like SimpleTexture, OctreeImage has animated version: reference videostreams instead of reference images, plus two additional streams of octrees representing geometry and voxel-to-image correspondence for each 3D frame. Very useful feature of an OctreeImage format is its built-in mid-mapping capability.

The DIBR family has been developed for the new version of MPEG-4 standard, and adopted for inclusion into MPEG's Animation Framework eXtension (AFX). AFX provides more enhanced features for synthetic MPEG-4 environments, and includes a collection of interoperable tools that produce a reusable architecture for interactive animated contents (compatible with existing MPEG-4). Each AFX tool shows the compatibility with a BIFS node, a synthetic stream, and an audio-visual stream. The current version of the AFX consists of higher-level descriptions of animation (e.g., bone and skin based animation), enhanced rendering (e.g., procedural texturing, light-field mapping), compact representations (e.g., NURBS, solid representation, subdivision surfaces), low bit-rate animations (e.g., interpolator compression) and others, as well as our proposed DIBR.

DIBR formats were designed so as to combine advantages of different ideas suggested earlier, providing a user with flexible tools best suited for a particular task. For example, non-animated SimpleTexture and PointTexture are particular cases of the known formats, while OctreeImage is an apparently new representation. But in MPEG-4 context, all the three basic DIBR formats can be considered as building blocks, and their combinations by means of MPEG-4 constructs not only embrace many of the image-based representations suggested in the literatures, but also give a great potential for constructing new such formats.

Now, Depth Image-Based Representation will be described.

Taking into account the ideas outlined in the previous section, as well as some of our own developments, we suggested the following set of image-based formats for use in MPEG-4 AFX: SimpleTexture, PointTexture, DepthImage, and OctreeImage. Note that SimpleTexture and OctreeImage have animated versions.

SimpleTexture is a single image combined with depth image. It is equivalent to RT, while PointTexture is equivalent to LDI.

Based on SimpleTexture and PointTexture as building blocks, we can construct a variety of representations using MPEG-4 constructs. Formal specification will be given later, and here we describe the result geometrically.

DepthImage structure defines either SimpleTexture or PointTexture together with bounding box, position in space and some other information. A set of DepthImages can be unified under a single structure called Transform node, and this allows construction of a variety of useful representations. Most commonly used are the two of them that do not have a specific MPEG-4 name, but in our practice we called them Box Texture (BT), and Generalized Box Texture (GBT). BT is a union of six SimpleTextures corresponding to a bounding cube of an object or a scene, while GBT is an arbitrary union of any number of SimpleTextures that together provide a consistent 3D representation. Example of BT is given in FIG. 22, where reference images, depth maps and the resulting 3D object are shown. BT can be rendered with the aid of incremental warping algorithm [6], but we use different approach applicable to GBT as well. An example of GBT representation is shown in FIG. 23, where 21 SimpleTextures are used to represent a complex object, the palm tree.

It should be noted that unification mechanism allows, for instance, the use of several LDIs with different cameras to represent the same object, or parts of the same object. Hence, data structures like image-based objects, cells of LDI tree, cells of surfels-based tree structure, are all particular cases of this format, which obviously offers much greater flexibility in adapting location and resolution of SimpleTextures and PointTextures to the structure of the scene.

Next, OctreeImage: Textured Binary Volumetric Octree (TBVO), will be described.

In order to utilize multiresolution geometry and texture with more flexible representation and fast rendering, we develop OctreeImage representation, which is based on Textured Binary Volumetric Octree (TBVO). The objective of TBVO is to contrive a flexible representation/compression format with fast high quality visualization. TBVO consists of three main components—Binary Volumetric Octree (BVO) which represents geometry, a set of reference images, and image indices corresponding to the octree nodes.

Geometric information in BVO form is a set of binary (occupied or empty) regularly spaced voxels combined in larger cells in usual octree manner. This representation can be easily obtained from DepthImage data through the intermediate ‘point cloud’ form, since each pixel with depth defines a unique point in 3D space. Conversion of the point cloud to BVO is illustrated in FIG. 24. An analogous process allows converting polygonal model to BVO. Texture information of the BVO can be retrieved from reference images. A reference image is texture of voxels at a given camera position and orientation. Hence, BVO itself, together with reference images, does already provide the model representation. However, it turned out that additional structure storing the reference image index for each BVO leave allows visualizing much faster and with better quality.

The main BVO visualization problem is that we must determine corresponding camera index of each voxel during rendering. To this end, we must at least determine the existence of a camera, from which the voxel is visible. This procedure is very slow if we use brute-force approach. In addition to this problem, there are still some troubles for voxels that are not visible from any cameras, yielding undesirable artifacts in the rendered image.

A possible solution could be storing explicit color to each voxel. However, in this case, we have experienced some problem in compressing color information. That is, if we group voxel colors as an image format and compress it, the color correlation of neighboring voxels is destroyed such that the compression ratio would be unsatisfactory.

In TBVO, the problem is solved by storing camera (image) index for every voxel. The index is usually same for large group of voxels, and this allows the use of octree structure for economic storage of the additional information. Note that, on the average, only 15% volume increase, in comparison to representation using only BVO and reference images, was observed in the experiments with our models. It's modeling is a little bit more complex, but allows more flexible way of representing objects of any geometry.

Note that TBVO is a very convenient representation for rendering with the aid of splats, because splat size is easily computed from voxel size. Voxel color is easily determined using the reference images and the image index of the voxel.

Now, streaming of textured binary volumetric octree will be described.

We suppose that 255 cameras are enough, and assign up to 1 byte for the index. The TBVO stream is stream of symbols. Every TBVO-symbol is BVO-symbol or Texture-symbol. Texture-symbol denotes camera index, which could be a specific number or a code of “undefined”.

Let “undefined” code be ‘?’ for further description. The TBVO stream is traversed in breadth first order. Let us describe how to write TBVO stream if we have BVO and every leaf voxel has image index. This must be done in modeling stage. It will traverse all BVO nodes including leaf nodes (which do not have BVO-symbol) in breadth first order. In FIG. 25, the pseudo-code, which completes writing the stream, is shown.

An example of writing TBVO bitstream is shown in FIG. 14. For the TBVO tree shown in FIG. 14( a), a stream of symbols can be obtained as shown in FIG. 14( c), according to the procedure. In this example, the texture-symbols are represented in byte. However, in the actual stream, each texture-symbol would only need 2 bits because we only need to represent three values (two cameras and the undefined code).

Next, DIBR Animation will be described.

Animated versions were defined for two of the DIBR formats: DepthImage containing only SimpleTextures, and OctreeImage. Data volume is one of the crucial issues with 3D animation. We have chosen these particular formats because video streams can be naturally incorporated in the animated versions, providing substantial data reduction.

For DepthImage, animation is performed by replacing reference images by MPEG-4 MovieTextures. High-quality lossy video compression does not seriously affect appearance of the resulting 3D objects. Depth maps can be stored (in near lossless mode) in the alpha channels of reference video streams. At rendering stage, 3D frame is rendered after all the reference image and depth frames are received and decompressed.

Animation of OctreeImage is similar—reference images are replaced by MPEG-4 MovieTextures, and a new stream of octree appears.

MPEG-4 Node Specification will now be defined.

The DIBR formats are described in detail in MPEG-4 AFX nodes specifications [4]. DepthImage contains fields determining the parameters of view frustum for either SimpleTexture or PointTexture. OctreeImage node represents object in the form of TBVO-defined geometry and a set of reference image formats. Scene-dependent information is stored in special fields of the DIBR data structures, allowing the correct interaction of DIBR objects with the rest of the scene. The definition of DIBR nodes is shown in FIG. 26.

FIG. 27 illustrates spatial layout of the DepthImage, in which the meaning of each field is shown. Note that the DepthImage node defines a single DIBR object. When multiple DepthImage nodes are related to each other, they are processed as a group, and thus, should be placed under the same Transform node. The diTexture field specifies the texture with depth (SimpleTexture or PointTexture), which shall be mapped into the region defined in the DepthImage node.

The OctreeImage node defines an octree structure and their projected textures. The octreeResolution field specifies maximum number of octree leaves along a side of the enclosing cube. The octree field specifies a set of octree internal nodes. Each internal node is represented by a byte. 1 in ith bit of this byte means that the children nodes exist for the ith child of that internal node, while 0 means that it does not. The order of the octree internal nodes shall be the order of breadth first traversal of the octree. The order of eight children of an internal node is shown in FIG. 14( b). The voxelImageIndex field contains an array of image indices assigned to voxel. At the rendering stage, color attributed to an octree leaf is determined by orthographically projecting the leaf onto one of the images with a particular index. The indices are stored in an octree-like fashion: if a particular image can be used for all the leaves contained in a specific voxel, the voxel containing index of the image is issued into the stream; otherwise, the voxel containing a fixed ‘further subdivision’ code is issued, which means that image index will be specified separately for each children of the current voxel (in the same recursive fashion). If the voxelImageIndex is empty, then the image indices are determined during rendering stage. The images field specifies a set of DepthImage nodes with SimpleTexture for diTexture field. However, the nearPlane and farPlane field of the DepthImage node and the depth field in the SimpleTexture node are not used.

Rendering methods for DIBR formats are not part of AFX, but it is necessary to explain the ideas used to achieve simplicity, speed and quality of DIBR objects rendering. Our rendering methods are based on splats, small flat color patches used as ‘rendering primitives’. Two approaches outlined below are oriented at two different representations: DepthImage and OctreeImage. In our implementation, OpenGL functions are employed for splatting to accelerate the rendering. Nevertheless, software rendering is also possible, and allows optimized computation using the simple structure of DepthImage or OctreeImage.

The method we use for rendering DepthImage objects is extremely simple. It should be mentioned, however, that it depends on the OpenGL functions and works much faster with the aid of hardware accelerator. In this method, we transform all the pixels with depth from SimpleTextures and PointTextures that are to be rendered, into 3D points, then position small polygons (splats) at these points, and apply rendering functions of OpenGL. Pseudo-code of this procedure for SimpleTexture case is given in FIG. 28. PointTexture case is treated exactly in the same way.

Size of splat must be adapted to the distance between the point and the observer. We used the following simple approach. First, the enclosing cube of given 3D object is subdivided into a coarse uniform grid. Splat size is computed for each cell of the grid, and this value is used for the points inside the cell. The computation is performed as follows:

-   -   Map the cell on the screen by means of OpenGL.     -   Calculate length L of the largest diagonal of projection (in         pixels).     -   Estimate D (splat diameter) as

${C\frac{L}{N}},$ where N is average number of points per cell side and C is a heuristic constant, approximately 1.3.

We'd like to emphasize that this method could certainly be improved by sharper radius computations, more complex splats, antialiasing. However, even this simple approach provides good visual quality.

The same approach works for OctreeImage, where the nodes of the octree at one of coarser levels are used in the above computations of splat size. However, for the OctreeImage color information should first be mapped on the set of voxels. This can be done very easily, because each voxel has its corresponding reference image index. The pixel position in a reference image is also known during the parsing of octree stream. As soon as the colors of OctreeImage voxels are determined, splat sizes are estimated and the OpenGL-based rendering is used as described above.

DIBR formats have been implemented and tested on several 3D models. One of the models (“Tower”) was obtained by scanning actual physical object (Cyberware color 3D scanner was used), the others were converted from the 3DS-MAX demo package. Tests were performed on Intel Pentium-IV 1.8 GHz with OpenGL accelerator.

In the following subsections, we explain the methods of conversion from polygonal to DIBR formats, and then present the modeling, representation, and compression results of the different DIBR formats. Most of the data is for DepthImage and OctreeImage models; these formats have animated versions and can be effectively compressed. All the presented models have been constructed with the orthographic camera since it is, in general, preferable way to represent ‘compact’ objects. Note that the perspective camera is used mostly for economic DIBR representation of the distant environments.

DIBR model generation begins with obtaining sufficient number of SimpleTextures. For polygonal object the SimpleTextures are computed, while for the real-world object the data is obtained from digital cameras and scanning devices. Next step depends on the DIBR format we want to use.

DepthImage is simply a union of the obtained SimpleTextures. Although, depth maps may be stored in compressed form, only lossless compression is acceptable since even small distortion in geometry is often highly noticeable.

Reference images can be stored in lossy compressed form, but in this case a preprocessing is required. While it is generally tolerable to use popular methods like JPEG lossy compression, the boundary artifacts become more noticeable in the 3D object views generated—especially due to the boundaries between object and background of the reference image, where the background color appears to ‘spill’ into the object. The solution we have used to cope with the problem is to extend the image in the boundary blocks into the background using average color of the block and fast decay of intensity, and then apply the JPEG compression. The effect resembles ‘squeezing’ the distortion into the background where it is harmless since background pixels are not used for rendering. Internal boundaries in lossy compressed reference images may also produce artifacts, but these are generally less visible.

To generate OctreeImage models we use an intermediate point-based representation (PBR). Set of points that constitute PBR is union of the colored points obtained by shifting pixels in reference images by distances specified in the corresponding depth maps. Original SimpleTextures should be constructed so that the resulting PBR would provide sufficiently accurate approximation of the object surface. After that, PBR is converted into OctreeImage as outlined in FIG. 24, and is used to generate a new complete set of reference images that satisfy restrictions imposed by this format. At the same time, additional data structure voxelImageIndex representing reference image indices for octree voxels, is generated. In case reference images should be stored in lossy formats, they are first preprocessed as explained in previous subsection. Besides, since TBVO structure explicitly specifies the pixel containing its color of each voxel, redundant pixels are discarded, which further reduces the volume of voxelImageIndex. Examples of the original and processed reference images in the JPEG format are shown in FIG. 29.

Note that quality degradation due to lossy compression is negligible for OctreeImages, but sometimes still noticeable for DepthImage objects.

PointTexture models are constructed using projection of the object onto a reference plane, as explained in Section 2.1. If this does not produce enough samples (which may be the case for the surface parts nearly tangent to vector of projection), additional SimpleTextures are constructed to provide more samples. The obtained set of points is then reorganized into the PointTexture structure.

Data on rendering speed will now be presented. Rendering speed of DepthImage “Palm512” is about 2 fps (note that it is 21 Simple textures), while other static models we tested with reference image side 512 are rendered at 5-6 fps. Note that rendering speed depends mostly on the number and resolution of the reference images, but not on the complexity of the scene. This is an important advantage over the polygonal representations, especially in animated case. Animated OctreeImage “Dragon512” is visualized at 24 frames per second (fps).

“Angel256” DepthImage model is shown in FIG. 22. FIGS. 30 through 34 show several other DIBR and polygonal models. FIG. 30 compares appearance of polygonal and DepthImage “Morton” model. DepthImage model uses reference images in the JPEG format and rendering is performed by simplest splatting described in Section 5, but image quality is quite acceptable. FIG. 31 compares two versions of the scanned “Tower” model. Black dots in the upper part of the model are due to noisy input data. FIG. 32 demonstrates more complex “Palm” model, composed of 21 SimpleTextures. It also shows good quality, although leaves are, in general, wider than in the 3DS-MAX original—which is a consequence of simplified splatting.

FIG. 33 presents a 3D frame from “Dragon512” OctreeImage animation. FIG. 34 demonstrates ability of a PointTexture format to provide models of excellent quality.

The depth image-based node structure according to the present invention includes SimpleTexture node, PointTexture node, DepthImage node and OctreeImage node. The DepthImage node is composed of depth information and color image. The color image is selected from the SimpleTexture node and PointTexture node.

When an object is viewed from six viewpoints (front, back, plan, rear, left and right sides), the object can be represented by six pairs of SimpleTexture nodes. The specification of the SimpleTexture node is shown in FIG. 26.

Referring to FIG. 26, the SimpleTexture node is composed of a Texture field in which a color image containing the color for each pixel is recorded, and a depth field in which the depth for each pixel is recorded. The SimpleTexture node defines a single IBR texture. Here, a texture means a colored plane image.

A plane image containing the color for each pixel forming the image is in the texture field. The depth for each pixel forming the image is recorded in the depth field. A set of depths in the depth field form the depth images corresponding to the plane image in the texture field. The depth images are plane images represented in gray scales according to the depths. In the case of a video format for generating animated objects, depth information and color information are multiple sequences of image frames.

The plane image in the texture field (that is, the colored image) and the plane image in the depth field (that is, the image represented in gray scales) constitute a SimpleTexture node. FIG. 20 shows “Morton” objects represented by the SimpleTexture nodes for front viewpoints. Conclusively, the objects are represented by six SimpleTexture nodes, which are pairs of images generated for six viewpoints. FIG. 22 shows “Angel” objects represented by six SimpleTexture nodes.

The color image can be represented by PointTexture nodes. FIG. 21 shows Point textures generated by projecting an object onto a reference plane (in this case, a plane spaced a predetermined distance apart from the object to face the back face of the object).

FIG. 26 also shows the specification of a PointTexture node.

Referring to FIG. 26, the PointTexture node is composed of a size field, a resolution field, a depth field and a color field. Size information of an image plane is recorded in the size field. The size field is composed of width and height fields where the width and height of the image plane are recorded, respectively. The size of the image plane is set to a size enough to cover the entire object projected onto the reference plane.

The resolution information on the depth for each pixel is recorded in the resolution field. For example, when a number “8” is recorded in the resolution field, the depth of an object is represented by 256 scales based on the distance from the reference plane.

Multiple pieces of depth information on each pixel are recorded in the depth field. The depth information is a sequence of numbers of pixels projected onto the image plane and depths for the respective pixels. Color information on each pixel is recorded in the color field. The color information is a sequence of colors corresponding to the respective pixels projected onto the image plane.

The viewpoint information constituting the DepthImage node includes several fields such as viewpoint, visibility, projection method, or distance.

In the viewpoint field, viewpoints from which an image plane is viewed are recorded. The viewpoint field has position and orientation fields where the position and orientation of the viewpoint are recorded. The position in the position field is a relative location of the viewpoint to the coordinate system's origin (0, 0, 0), while the orientation in the orientation field is a rotation amount of the viewpoint relative to the default orientation.

In the visibility field, a visibility area from the viewpoint to the image plane is recorded. In the projection method field, a projection method from the viewpoint to the image plane is recorded. In the present invention, the projection method includes an orthogonal projection method in which the visibility area is represented by width and height, and a perspective projection method in which the visibility area is represented by a horizontal angle and a vertical angle. When the orthogonal projection method is selected, that is, when the projection method field is set to TRUE, the width and the height of the visibility area correspond to the width and height of an image plane, respectively. When the perspective projection method is selected, the horizontal and vertical angles of the visibility area correspond to angles formed to horizontal and vertical sides by views ranging from a viewpoint to the image plane.

In the distance field, a distance from a viewpoint to a closer boundary plane and a distance from the viewpoint to a farther boundary plane are recorded. The distance field is composed of a nearPlane field and a farPlane field. The distance field defines an area for depth information.

FIGS. 35A and 35B are diagrams showing the relationships of the respective nodes when representing an object in a DepthImage format having SimpleTexture nodes and PointTexture nodes, respectively.

Referring to FIG. 35A, the object can be represented by sets of DepthImage nodes corresponding to six viewpoints. Each of the respective DepthImage nodes consists of viewpoint information and SimpleTexture. The SimpleTexture consists of a pair of color image and depth image.

Referring to FIG. 35B, the object can be represented by a DepthImage node. The specification of the DepthImage node is described as above. A PointTexture node is composed of plane information where information on a plane onto which the object is projected, and depth information and color information of various points of the objects projected onto the image plane.

In an OctreeImage node, an object is represented by the structure of internal nodes constituting voxels containing the object and reference images. The specification of the OctreeImage node is shown in FIG. 26.

Referring to FIG. 26, the OctreeImage node includes fields of octreeResolution, octree, vexelImageIndex and images.

In the octreeResolution field, the maximum number of octree leaves along a side of the enclosing cube containing the object is recorded. In the octree field, an internal node structure is recorded. An internal node is a node for a subcube generated after subdividing the enclosing cube containing the whole object. Subdivision of each subcube is iteratively performed to generate 8 subcubes until a predetermined number of subcubes is reached. In the case of iteratively performing subdivision 3 times, assuming that a node for a subcube after the second subdivision iteration is referred to as a current node, a node for a subcube after the first subdivision iteration and a node for a subcube after the third subdivision are referred to as a parent node and a child node, respectively. The order of 8 divided subcubes is given by the order of priority in width. FIG. 14 shows a method of assigning priority numbers of subcubes. Each internal node is represented by a byte. Node information recorded in bitstreams constituting the byte represents presence or absence of children nodes of children nodes belonging to the internal node.

In the index field, reference image indices corresponding to the respective internal nodes are recorded. In the image field, reference images corresponding to indices recorded in the index field are recorded. The reference images are DepthImage nodes and the structure thereof is described as above.

FIG. 36 is a diagram showing the structure of a pertinent OctreeImage node in representing an object using OctreeImage nodes.

Referring to FIG. 36, the OctreeImage nodes are encapsulated by bitwrappers. Each bitwrapper includes an OctreeImage node. When an object is represented in SimpleTexture nodes, the OctreeImage node includes 6 DepthImage nodes, each DepthImage node containing a SimpleTexture node.

The present invention can be implemented on a computer-readable recording medium by computer readable codes. The computer-readable recording medium includes all kinds of recording apparatus from which data readable by a computer system can be read, and examples thereof are ROM, RAM, CD-ROM, magnetic tapes, floppy disks, optical data storage devices or the like. Also, the computer-readable recording medium can be distributed in a computer system connected to a network so that computer readable codes are stored and implemented by a distributed method.

According to the present invention, in image-based representations, since perfect information on a colored 3D object is encoded by a set of 2D images-simple and regular structure instantly adopted into well-known methods for image processing and compression, the algorithm is simple and can be supported by the hardware in many aspects. In addition, rendering time for image-based models is proportional to the number of pixels in the reference and output images, but in general, not to the geometric complexity as in polygonal case. In addition, when the image-based representation is applied to real-world objects and scene, photo-realistic rendering of natural scene becomes possible without use of millions of polygons and expensive computation.

The foregoing description of an implementation of the invention has been presented for purposes of illustration and description. It is not exhaustive and does not limit the invention to the precise form disclosed. Modifications and variations are possible in light of the above teachings or may be acquired from practicing of the invention. The scope of the invention is defined by the claims and their equivalents. 

1. A non-transitory computer-readable medium having stored thereon a DepthImage node structure for representing a depth image based 3D object, with at least one DepthImage node stored on the medium having a structure comprising: a viewpoint field in which a viewpoint from which a plane of the image (“image plane”) is set to be viewed is recorded according to a local coordinate system of the one DepthImage node; a fieldOfView field in which a visibility area from the viewpoint to the image plane is set to be viewed is recorded; an orthographic field in which a projection method from the viewpoint to the image plane is recorded, wherein the projection method is one of an orthogonal projection method and a perspective projection method; nearPlane and farPlane fields which specify the distances, according to the local coordinate system, from the viewpoint to a near plane and a far plane of the visibility area, respectively, wherein the near plane and the far plane define an area used to determine depth information for the image; and a diTexture field which specifies a depth image texture identifying a texture with depth for the image, the image including a grid on projected image planes, the grid including plural cells with each cell having a center point, the depth information in a depth field comprises a still image frame and specifies multiple depths of each center point in the projected image planes, and color information identified by the diTexture field comprises a plurality of sequences of image frames, wherein the depth image texture identifies a reference video stream including animated texture and depth information covering all potentially visible parts of a surface of the 3D object.
 2. The computer-readable medium according to claim 1, wherein the viewpoint field includes a position field where the position of a viewpoint is recorded, and an orientation field where the orientation of the viewpoint is recorded, the position being a relative location to the coordinate system's origin, and the orientation being a rotation amount relative to the default orientation.
 3. The computer-readable medium according to claim 1, wherein the projection method includes an orthogonal projection method in which the visibility area is represented by width and height, and a perspective projection method in which the visibility area is represented by a horizontal angle and a vertical angle.
 4. The computer-readable medium according to claim 3, wherein when the orthogonal projection method is selected, the width and the height of the visibility area correspond to the width and height of an image plane, respectively, and when the perspective projection method is selected, the horizontal and vertical angles of the visibility area correspond to angles formed to horizontal and vertical sides by views ranging from a viewpoint to the image plane.
 5. The computer-readable medium according to claim 1, wherein the depth information is a sequence of numbers of pixels projected onto the image plane and depths for the respective pixels, and the color information is a sequence of colors corresponding to the respective pixels projected onto the image plane.
 6. The computer-readable medium according to claim 1, wherein the diTexture field includes: a texture field in which a colored plane image containing color information for each pixel forming the image is recorded; and a depth field in which the depth information for each pixel forming the image is recorded, wherein a set of the depth information in the depth field forms a depth image which corresponds to the colored plane image in the texture field, and wherein the depth image is represented as a gray scale plane image according to the depth information.
 7. A non-transitory computer-readable medium having stored thereon a DepthImage node structure for representing a depth image based 3D object, with at least one DepthImage node stored on the medium having a structure comprising: a viewpoint field in which a viewpoint from which a plane of the image (“image plane”) is set to be viewed is recorded according to a local coordinate system of the one DepthImage node; a fieldOfView field in which a visibility area from the viewpoint to the image plane is set to be viewed is recorded; an orthographic field in which a projection method from the viewpoint to the image plane is recorded, wherein the projection method is one of an orthogonal projection method and a perspective projection method; nearPlane and farPlane fields which specify the distances, according to the local coordinate system, from the viewpoint to a near plane and a far plane of the visibility area, respectively, wherein the near plane and the far plane define an area used to determine depth information for the image; and a diTexture field which specifies a depth image texture identifying a texture with depth for the image, the image including a grid on projected image planes, the grid including plural cells with each cell having a center point, the depth information in the depth field comprises a plurality of sequences of image frames and specifies multiple depths of each center point in the projected image planes, and the color information identified by the diTexture field comprises a still image frame, wherein the depth image texture identifies a reference video stream including animated texture and depth information covering all potentially visible parts of a surface of the 3D object.
 8. The computer-readable medium according to claim 1, the depth information is retrieved from a corresponding alpha channel in a texture field of each image frame of the plurality of sequences of image frames.
 9. The computer-readable medium according to claim 1, wherein the diTexture field includes: a width field in which width information of an image plane is recorded; a height field in which height information of the image plane is recorded; the depth field in which multiple pieces of depth information on each pixel are recorded; and a color field in which color information on each pixel is recorded.
 10. The computer-readable medium according to claim 9, wherein the diTexture field further includes: a resolution (depthNbBits) field in which the resolution of the depth for each pixel is recorded.
 11. A non-transitory computer-readable medium having stored thereon a DepthImage node structure for representing a depth image based 3D object, with at least one DepthImage node stored on the medium having a structure comprising: a viewpoint field in which a viewpoint from which a plane of the image (“image plane”) is set to be viewed is recorded according to a local coordinate system of the one DepthImage node; a fieldOfView field in which a visibility area from the viewpoint to the image plane is set to be viewed is recorded; an orthographic field in which a projection method from the viewpoint to the image plane is recorded, wherein the projection method is one of an orthogonal projection method and a perspective projection method; nearPlane and farPlane fields which specify the distances, according to the local coordinate system, from the viewpoint to a near plane and a far plane of the visibility area, respectively, wherein the near plane and the far plane define an area used to determine depth information for the image; and a diTexture field which specifies a depth image texture identifying a texture with depth for the image, the image including a grid on projected image planes, the grid including plural cells with each cell having a center point, the depth information in a depth field comprises a still image frame and specifies multiple depths of each center point in the projected image planes, and color information identified by the diTexture field comprises a plurality of sequences of image frames, wherein the viewpoint field includes a position field where the position of a viewpoint is recorded, and an orientation field where the orientation of the viewpoint is recorded, the position being a relative location to the coordinate system's origin, and the orientation being a rotation amount relative to the default orientation, wherein the projection method includes an orthogonal projection method in which the visibility area is represented by width and height, and a perspective projection method in which the visibility area is represented by a horizontal angle and a vertical angle, and wherein the diTexture field includes: a texture field in which a colored plane image containing color information for each pixel forming the image is recorded; and a depth field in which the depth information for each pixel forming the image is recorded, wherein a set of the depth information in the depth field forms a depth image which corresponds to the colored plane image in the texture field, and wherein the depth image is represented as a gray scale plane image according to the depth information, wherein the depth image texture identifies a reference video stream including animated texture and depth information covering all potentially visible parts of a surface of the 3D object.
 12. The computer-readable medium according to claim 1, wherein the depth image texture identifies a SimpleTexture depth image texture.
 13. The computer-readable medium according to claim 7, wherein the depth image texture identifies a SimpleTexture depth image texture.
 14. The computer-readable medium according to claim 11, wherein the depth image texture identifies a SimpleTexture depth image texture.
 15. The computer-readable medium according to claim 1, wherein if the depth is unspecified, the depth information is retrieved from an alpha channel identified by the diTexture field.
 16. The computer-readable medium according to claim 7, wherein if the depth is unspecified, the depth information is retrieved from an alpha channel identified by the diTexture field.
 17. The computer-readable medium according to claim 11, wherein if the depth is unspecified, the depth information is retrieved from an alpha channel identified by the diTexture field. 